3 * This file contains the interface to the underlying bignum package.
4 * Its most important design principle is to completely hide the inner
5 * working of that other package from the user of GiNaC. It must either
6 * provide implementation of arithmetic operators and numerical evaluation
7 * of special functions or implement the interface to the bignum package. */
10 * GiNaC Copyright (C) 1999-2007 Johannes Gutenberg University Mainz, Germany
12 * This program is free software; you can redistribute it and/or modify
13 * it under the terms of the GNU General Public License as published by
14 * the Free Software Foundation; either version 2 of the License, or
15 * (at your option) any later version.
17 * This program is distributed in the hope that it will be useful,
18 * but WITHOUT ANY WARRANTY; without even the implied warranty of
19 * MERCHANTABILITY or FITNESS FOR A PARTICULAR PURPOSE. See the
20 * GNU General Public License for more details.
22 * You should have received a copy of the GNU General Public License
23 * along with this program; if not, write to the Free Software
24 * Foundation, Inc., 51 Franklin Street, Fifth Floor, Boston, MA 02110-1301 USA
37 #include "operators.h"
42 // CLN should pollute the global namespace as little as possible. Hence, we
43 // include most of it here and include only the part needed for properly
44 // declaring cln::cl_number in numeric.h. This can only be safely done in
45 // namespaced versions of CLN, i.e. version > 1.1.0. Also, we only need a
46 // subset of CLN, so we don't include the complete <cln/cln.h> but only the
48 #include <cln/output.h>
49 #include <cln/integer_io.h>
50 #include <cln/integer_ring.h>
51 #include <cln/rational_io.h>
52 #include <cln/rational_ring.h>
53 #include <cln/lfloat_class.h>
54 #include <cln/lfloat_io.h>
55 #include <cln/real_io.h>
56 #include <cln/real_ring.h>
57 #include <cln/complex_io.h>
58 #include <cln/complex_ring.h>
59 #include <cln/numtheory.h>
63 GINAC_IMPLEMENT_REGISTERED_CLASS_OPT(numeric, basic,
64 print_func<print_context>(&numeric::do_print).
65 print_func<print_latex>(&numeric::do_print_latex).
66 print_func<print_csrc>(&numeric::do_print_csrc).
67 print_func<print_csrc_cl_N>(&numeric::do_print_csrc_cl_N).
68 print_func<print_tree>(&numeric::do_print_tree).
69 print_func<print_python_repr>(&numeric::do_print_python_repr))
72 // default constructor
75 /** default ctor. Numerically it initializes to an integer zero. */
76 numeric::numeric() : basic(&numeric::tinfo_static)
79 setflag(status_flags::evaluated | status_flags::expanded);
88 numeric::numeric(int i) : basic(&numeric::tinfo_static)
90 // Not the whole int-range is available if we don't cast to long
91 // first. This is due to the behaviour of the cl_I-ctor, which
92 // emphasizes efficiency. However, if the integer is small enough
93 // we save space and dereferences by using an immediate type.
94 // (C.f. <cln/object.h>)
95 // The #if clause prevents compiler warnings on 64bit machines where the
96 // comparision is always true.
97 #if cl_value_len >= 32
100 if (i < (1L << (cl_value_len-1)) && i >= -(1L << (cl_value_len-1)))
101 value = cln::cl_I(i);
103 value = cln::cl_I(static_cast<long>(i));
105 setflag(status_flags::evaluated | status_flags::expanded);
109 numeric::numeric(unsigned int i) : basic(&numeric::tinfo_static)
111 // Not the whole uint-range is available if we don't cast to ulong
112 // first. This is due to the behaviour of the cl_I-ctor, which
113 // emphasizes efficiency. However, if the integer is small enough
114 // we save space and dereferences by using an immediate type.
115 // (C.f. <cln/object.h>)
116 // The #if clause prevents compiler warnings on 64bit machines where the
117 // comparision is always true.
118 #if cl_value_len >= 32
119 value = cln::cl_I(i);
121 if (i < (1UL << (cl_value_len-1)))
122 value = cln::cl_I(i);
124 value = cln::cl_I(static_cast<unsigned long>(i));
126 setflag(status_flags::evaluated | status_flags::expanded);
130 numeric::numeric(long i) : basic(&numeric::tinfo_static)
132 value = cln::cl_I(i);
133 setflag(status_flags::evaluated | status_flags::expanded);
137 numeric::numeric(unsigned long i) : basic(&numeric::tinfo_static)
139 value = cln::cl_I(i);
140 setflag(status_flags::evaluated | status_flags::expanded);
144 /** Constructor for rational numerics a/b.
146 * @exception overflow_error (division by zero) */
147 numeric::numeric(long numer, long denom) : basic(&numeric::tinfo_static)
150 throw std::overflow_error("division by zero");
151 value = cln::cl_I(numer) / cln::cl_I(denom);
152 setflag(status_flags::evaluated | status_flags::expanded);
156 numeric::numeric(double d) : basic(&numeric::tinfo_static)
158 // We really want to explicitly use the type cl_LF instead of the
159 // more general cl_F, since that would give us a cl_DF only which
160 // will not be promoted to cl_LF if overflow occurs:
161 value = cln::cl_float(d, cln::default_float_format);
162 setflag(status_flags::evaluated | status_flags::expanded);
166 /** ctor from C-style string. It also accepts complex numbers in GiNaC
167 * notation like "2+5*I". */
168 numeric::numeric(const char *s) : basic(&numeric::tinfo_static)
170 cln::cl_N ctorval = 0;
171 // parse complex numbers (functional but not completely safe, unfortunately
172 // std::string does not understand regexpese):
173 // ss should represent a simple sum like 2+5*I
175 std::string::size_type delim;
177 // make this implementation safe by adding explicit sign
178 if (ss.at(0) != '+' && ss.at(0) != '-' && ss.at(0) != '#')
181 // We use 'E' as exponent marker in the output, but some people insist on
182 // writing 'e' at input, so let's substitute them right at the beginning:
183 while ((delim = ss.find("e"))!=std::string::npos)
184 ss.replace(delim,1,"E");
188 // chop ss into terms from left to right
190 bool imaginary = false;
191 delim = ss.find_first_of(std::string("+-"),1);
192 // Do we have an exponent marker like "31.415E-1"? If so, hop on!
193 if (delim!=std::string::npos && ss.at(delim-1)=='E')
194 delim = ss.find_first_of(std::string("+-"),delim+1);
195 term = ss.substr(0,delim);
196 if (delim!=std::string::npos)
197 ss = ss.substr(delim);
198 // is the term imaginary?
199 if (term.find("I")!=std::string::npos) {
201 term.erase(term.find("I"),1);
203 if (term.find("*")!=std::string::npos)
204 term.erase(term.find("*"),1);
205 // correct for trivial +/-I without explicit factor on I:
210 if (term.find('.')!=std::string::npos || term.find('E')!=std::string::npos) {
211 // CLN's short type cl_SF is not very useful within the GiNaC
212 // framework where we are mainly interested in the arbitrary
213 // precision type cl_LF. Hence we go straight to the construction
214 // of generic floats. In order to create them we have to convert
215 // our own floating point notation used for output and construction
216 // from char * to CLN's generic notation:
217 // 3.14 --> 3.14e0_<Digits>
218 // 31.4E-1 --> 31.4e-1_<Digits>
220 // No exponent marker? Let's add a trivial one.
221 if (term.find("E")==std::string::npos)
224 term = term.replace(term.find("E"),1,"e");
225 // append _<Digits> to term
226 term += "_" + ToString((unsigned)Digits);
227 // construct float using cln::cl_F(const char *) ctor.
229 ctorval = ctorval + cln::complex(cln::cl_I(0),cln::cl_F(term.c_str()));
231 ctorval = ctorval + cln::cl_F(term.c_str());
233 // this is not a floating point number...
235 ctorval = ctorval + cln::complex(cln::cl_I(0),cln::cl_R(term.c_str()));
237 ctorval = ctorval + cln::cl_R(term.c_str());
239 } while (delim != std::string::npos);
241 setflag(status_flags::evaluated | status_flags::expanded);
245 /** Ctor from CLN types. This is for the initiated user or internal use
247 numeric::numeric(const cln::cl_N &z) : basic(&numeric::tinfo_static)
250 setflag(status_flags::evaluated | status_flags::expanded);
258 numeric::numeric(const archive_node &n, lst &sym_lst) : inherited(n, sym_lst)
260 cln::cl_N ctorval = 0;
262 // Read number as string
264 if (n.find_string("number", str)) {
265 std::istringstream s(str);
266 cln::cl_idecoded_float re, im;
270 case 'R': // Integer-decoded real number
271 s >> re.sign >> re.mantissa >> re.exponent;
272 ctorval = re.sign * re.mantissa * cln::expt(cln::cl_float(2.0, cln::default_float_format), re.exponent);
274 case 'C': // Integer-decoded complex number
275 s >> re.sign >> re.mantissa >> re.exponent;
276 s >> im.sign >> im.mantissa >> im.exponent;
277 ctorval = cln::complex(re.sign * re.mantissa * cln::expt(cln::cl_float(2.0, cln::default_float_format), re.exponent),
278 im.sign * im.mantissa * cln::expt(cln::cl_float(2.0, cln::default_float_format), im.exponent));
280 default: // Ordinary number
287 setflag(status_flags::evaluated | status_flags::expanded);
290 void numeric::archive(archive_node &n) const
292 inherited::archive(n);
294 // Write number as string
295 std::ostringstream s;
296 if (this->is_crational())
299 // Non-rational numbers are written in an integer-decoded format
300 // to preserve the precision
301 if (this->is_real()) {
302 cln::cl_idecoded_float re = cln::integer_decode_float(cln::the<cln::cl_F>(value));
304 s << re.sign << " " << re.mantissa << " " << re.exponent;
306 cln::cl_idecoded_float re = cln::integer_decode_float(cln::the<cln::cl_F>(cln::realpart(cln::the<cln::cl_N>(value))));
307 cln::cl_idecoded_float im = cln::integer_decode_float(cln::the<cln::cl_F>(cln::imagpart(cln::the<cln::cl_N>(value))));
309 s << re.sign << " " << re.mantissa << " " << re.exponent << " ";
310 s << im.sign << " " << im.mantissa << " " << im.exponent;
313 n.add_string("number", s.str());
316 DEFAULT_UNARCHIVE(numeric)
319 // functions overriding virtual functions from base classes
322 /** Helper function to print a real number in a nicer way than is CLN's
323 * default. Instead of printing 42.0L0 this just prints 42.0 to ostream os
324 * and instead of 3.99168L7 it prints 3.99168E7. This is fine in GiNaC as
325 * long as it only uses cl_LF and no other floating point types that we might
326 * want to visibly distinguish from cl_LF.
328 * @see numeric::print() */
329 static void print_real_number(const print_context & c, const cln::cl_R & x)
331 cln::cl_print_flags ourflags;
332 if (cln::instanceof(x, cln::cl_RA_ring)) {
333 // case 1: integer or rational
334 if (cln::instanceof(x, cln::cl_I_ring) ||
335 !is_a<print_latex>(c)) {
336 cln::print_real(c.s, ourflags, x);
337 } else { // rational output in LaTeX context
341 cln::print_real(c.s, ourflags, cln::abs(cln::numerator(cln::the<cln::cl_RA>(x))));
343 cln::print_real(c.s, ourflags, cln::denominator(cln::the<cln::cl_RA>(x)));
348 // make CLN believe this number has default_float_format, so it prints
349 // 'E' as exponent marker instead of 'L':
350 ourflags.default_float_format = cln::float_format(cln::the<cln::cl_F>(x));
351 cln::print_real(c.s, ourflags, x);
355 /** Helper function to print integer number in C++ source format.
357 * @see numeric::print() */
358 static void print_integer_csrc(const print_context & c, const cln::cl_I & x)
360 // Print small numbers in compact float format, but larger numbers in
362 const int max_cln_int = 536870911; // 2^29-1
363 if (x >= cln::cl_I(-max_cln_int) && x <= cln::cl_I(max_cln_int))
364 c.s << cln::cl_I_to_int(x) << ".0";
366 c.s << cln::double_approx(x);
369 /** Helper function to print real number in C++ source format.
371 * @see numeric::print() */
372 static void print_real_csrc(const print_context & c, const cln::cl_R & x)
374 if (cln::instanceof(x, cln::cl_I_ring)) {
377 print_integer_csrc(c, cln::the<cln::cl_I>(x));
379 } else if (cln::instanceof(x, cln::cl_RA_ring)) {
382 const cln::cl_I numer = cln::numerator(cln::the<cln::cl_RA>(x));
383 const cln::cl_I denom = cln::denominator(cln::the<cln::cl_RA>(x));
384 if (cln::plusp(x) > 0) {
386 print_integer_csrc(c, numer);
389 print_integer_csrc(c, -numer);
392 print_integer_csrc(c, denom);
398 c.s << cln::double_approx(x);
402 /** Helper function to print real number in C++ source format using cl_N types.
404 * @see numeric::print() */
405 static void print_real_cl_N(const print_context & c, const cln::cl_R & x)
407 if (cln::instanceof(x, cln::cl_I_ring)) {
410 c.s << "cln::cl_I(\"";
411 print_real_number(c, x);
414 } else if (cln::instanceof(x, cln::cl_RA_ring)) {
417 cln::cl_print_flags ourflags;
418 c.s << "cln::cl_RA(\"";
419 cln::print_rational(c.s, ourflags, cln::the<cln::cl_RA>(x));
425 c.s << "cln::cl_F(\"";
426 print_real_number(c, cln::cl_float(1.0, cln::default_float_format) * x);
427 c.s << "_" << Digits << "\")";
431 void numeric::print_numeric(const print_context & c, const char *par_open, const char *par_close, const char *imag_sym, const char *mul_sym, unsigned level) const
433 const cln::cl_R r = cln::realpart(value);
434 const cln::cl_R i = cln::imagpart(value);
438 // case 1, real: x or -x
439 if ((precedence() <= level) && (!this->is_nonneg_integer())) {
441 print_real_number(c, r);
444 print_real_number(c, r);
450 // case 2, imaginary: y*I or -y*I
454 if (precedence()<=level)
457 c.s << "-" << imag_sym;
459 print_real_number(c, i);
460 c.s << mul_sym << imag_sym;
462 if (precedence()<=level)
468 // case 3, complex: x+y*I or x-y*I or -x+y*I or -x-y*I
469 if (precedence() <= level)
471 print_real_number(c, r);
474 c.s << "-" << imag_sym;
476 print_real_number(c, i);
477 c.s << mul_sym << imag_sym;
481 c.s << "+" << imag_sym;
484 print_real_number(c, i);
485 c.s << mul_sym << imag_sym;
488 if (precedence() <= level)
494 void numeric::do_print(const print_context & c, unsigned level) const
496 print_numeric(c, "(", ")", "I", "*", level);
499 void numeric::do_print_latex(const print_latex & c, unsigned level) const
501 print_numeric(c, "{(", ")}", "i", " ", level);
504 void numeric::do_print_csrc(const print_csrc & c, unsigned level) const
506 std::ios::fmtflags oldflags = c.s.flags();
507 c.s.setf(std::ios::scientific);
508 int oldprec = c.s.precision();
511 if (is_a<print_csrc_double>(c))
512 c.s.precision(std::numeric_limits<double>::digits10 + 1);
514 c.s.precision(std::numeric_limits<float>::digits10 + 1);
516 if (this->is_real()) {
519 print_real_csrc(c, cln::the<cln::cl_R>(value));
524 c.s << "std::complex<";
525 if (is_a<print_csrc_double>(c))
530 print_real_csrc(c, cln::realpart(value));
532 print_real_csrc(c, cln::imagpart(value));
537 c.s.precision(oldprec);
540 void numeric::do_print_csrc_cl_N(const print_csrc_cl_N & c, unsigned level) const
542 if (this->is_real()) {
545 print_real_cl_N(c, cln::the<cln::cl_R>(value));
550 c.s << "cln::complex(";
551 print_real_cl_N(c, cln::realpart(value));
553 print_real_cl_N(c, cln::imagpart(value));
558 void numeric::do_print_tree(const print_tree & c, unsigned level) const
560 c.s << std::string(level, ' ') << value
561 << " (" << class_name() << ")" << " @" << this
562 << std::hex << ", hash=0x" << hashvalue << ", flags=0x" << flags << std::dec
566 void numeric::do_print_python_repr(const print_python_repr & c, unsigned level) const
568 c.s << class_name() << "('";
569 print_numeric(c, "(", ")", "I", "*", level);
573 bool numeric::info(unsigned inf) const
576 case info_flags::numeric:
577 case info_flags::polynomial:
578 case info_flags::rational_function:
580 case info_flags::real:
582 case info_flags::rational:
583 case info_flags::rational_polynomial:
584 return is_rational();
585 case info_flags::crational:
586 case info_flags::crational_polynomial:
587 return is_crational();
588 case info_flags::integer:
589 case info_flags::integer_polynomial:
591 case info_flags::cinteger:
592 case info_flags::cinteger_polynomial:
593 return is_cinteger();
594 case info_flags::positive:
595 return is_positive();
596 case info_flags::negative:
597 return is_negative();
598 case info_flags::nonnegative:
599 return !is_negative();
600 case info_flags::posint:
601 return is_pos_integer();
602 case info_flags::negint:
603 return is_integer() && is_negative();
604 case info_flags::nonnegint:
605 return is_nonneg_integer();
606 case info_flags::even:
608 case info_flags::odd:
610 case info_flags::prime:
612 case info_flags::algebraic:
618 bool numeric::is_polynomial(const ex & var) const
623 int numeric::degree(const ex & s) const
628 int numeric::ldegree(const ex & s) const
633 ex numeric::coeff(const ex & s, int n) const
635 return n==0 ? *this : _ex0;
638 /** Disassemble real part and imaginary part to scan for the occurrence of a
639 * single number. Also handles the imaginary unit. It ignores the sign on
640 * both this and the argument, which may lead to what might appear as funny
641 * results: (2+I).has(-2) -> true. But this is consistent, since we also
642 * would like to have (-2+I).has(2) -> true and we want to think about the
643 * sign as a multiplicative factor. */
644 bool numeric::has(const ex &other, unsigned options) const
646 if (!is_exactly_a<numeric>(other))
648 const numeric &o = ex_to<numeric>(other);
649 if (this->is_equal(o) || this->is_equal(-o))
651 if (o.imag().is_zero()) { // e.g. scan for 3 in -3*I
652 if (!this->real().is_equal(*_num0_p))
653 if (this->real().is_equal(o) || this->real().is_equal(-o))
655 if (!this->imag().is_equal(*_num0_p))
656 if (this->imag().is_equal(o) || this->imag().is_equal(-o))
661 if (o.is_equal(I)) // e.g scan for I in 42*I
662 return !this->is_real();
663 if (o.real().is_zero()) // e.g. scan for 2*I in 2*I+1
664 if (!this->imag().is_equal(*_num0_p))
665 if (this->imag().is_equal(o*I) || this->imag().is_equal(-o*I))
672 /** Evaluation of numbers doesn't do anything at all. */
673 ex numeric::eval(int level) const
675 // Warning: if this is ever gonna do something, the ex ctors from all kinds
676 // of numbers should be checking for status_flags::evaluated.
681 /** Cast numeric into a floating-point object. For example exact numeric(1) is
682 * returned as a 1.0000000000000000000000 and so on according to how Digits is
683 * currently set. In case the object already was a floating point number the
684 * precision is trimmed to match the currently set default.
686 * @param level ignored, only needed for overriding basic::evalf.
687 * @return an ex-handle to a numeric. */
688 ex numeric::evalf(int level) const
690 // level can safely be discarded for numeric objects.
691 return numeric(cln::cl_float(1.0, cln::default_float_format) * value);
694 ex numeric::conjugate() const
699 return numeric(cln::conjugate(this->value));
702 ex numeric::real_part() const
704 return numeric(cln::realpart(value));
707 ex numeric::imag_part() const
709 return numeric(cln::imagpart(value));
714 int numeric::compare_same_type(const basic &other) const
716 GINAC_ASSERT(is_exactly_a<numeric>(other));
717 const numeric &o = static_cast<const numeric &>(other);
719 return this->compare(o);
723 bool numeric::is_equal_same_type(const basic &other) const
725 GINAC_ASSERT(is_exactly_a<numeric>(other));
726 const numeric &o = static_cast<const numeric &>(other);
728 return this->is_equal(o);
732 unsigned numeric::calchash() const
734 // Base computation of hashvalue on CLN's hashcode. Note: That depends
735 // only on the number's value, not its type or precision (i.e. a true
736 // equivalence relation on numbers). As a consequence, 3 and 3.0 share
737 // the same hashvalue. That shouldn't really matter, though.
738 setflag(status_flags::hash_calculated);
739 hashvalue = golden_ratio_hash(cln::equal_hashcode(value));
745 // new virtual functions which can be overridden by derived classes
751 // non-virtual functions in this class
756 /** Numerical addition method. Adds argument to *this and returns result as
757 * a numeric object. */
758 const numeric numeric::add(const numeric &other) const
760 return numeric(value + other.value);
764 /** Numerical subtraction method. Subtracts argument from *this and returns
765 * result as a numeric object. */
766 const numeric numeric::sub(const numeric &other) const
768 return numeric(value - other.value);
772 /** Numerical multiplication method. Multiplies *this and argument and returns
773 * result as a numeric object. */
774 const numeric numeric::mul(const numeric &other) const
776 return numeric(value * other.value);
780 /** Numerical division method. Divides *this by argument and returns result as
783 * @exception overflow_error (division by zero) */
784 const numeric numeric::div(const numeric &other) const
786 if (cln::zerop(other.value))
787 throw std::overflow_error("numeric::div(): division by zero");
788 return numeric(value / other.value);
792 /** Numerical exponentiation. Raises *this to the power given as argument and
793 * returns result as a numeric object. */
794 const numeric numeric::power(const numeric &other) const
796 // Shortcut for efficiency and numeric stability (as in 1.0 exponent):
797 // trap the neutral exponent.
798 if (&other==_num1_p || cln::equal(other.value,_num1_p->value))
801 if (cln::zerop(value)) {
802 if (cln::zerop(other.value))
803 throw std::domain_error("numeric::eval(): pow(0,0) is undefined");
804 else if (cln::zerop(cln::realpart(other.value)))
805 throw std::domain_error("numeric::eval(): pow(0,I) is undefined");
806 else if (cln::minusp(cln::realpart(other.value)))
807 throw std::overflow_error("numeric::eval(): division by zero");
811 return numeric(cln::expt(value, other.value));
816 /** Numerical addition method. Adds argument to *this and returns result as
817 * a numeric object on the heap. Use internally only for direct wrapping into
818 * an ex object, where the result would end up on the heap anyways. */
819 const numeric &numeric::add_dyn(const numeric &other) const
821 // Efficiency shortcut: trap the neutral element by pointer. This hack
822 // is supposed to keep the number of distinct numeric objects low.
825 else if (&other==_num0_p)
828 return static_cast<const numeric &>((new numeric(value + other.value))->
829 setflag(status_flags::dynallocated));
833 /** Numerical subtraction method. Subtracts argument from *this and returns
834 * result as a numeric object on the heap. Use internally only for direct
835 * wrapping into an ex object, where the result would end up on the heap
837 const numeric &numeric::sub_dyn(const numeric &other) const
839 // Efficiency shortcut: trap the neutral exponent (first by pointer). This
840 // hack is supposed to keep the number of distinct numeric objects low.
841 if (&other==_num0_p || cln::zerop(other.value))
844 return static_cast<const numeric &>((new numeric(value - other.value))->
845 setflag(status_flags::dynallocated));
849 /** Numerical multiplication method. Multiplies *this and argument and returns
850 * result as a numeric object on the heap. Use internally only for direct
851 * wrapping into an ex object, where the result would end up on the heap
853 const numeric &numeric::mul_dyn(const numeric &other) const
855 // Efficiency shortcut: trap the neutral element by pointer. This hack
856 // is supposed to keep the number of distinct numeric objects low.
859 else if (&other==_num1_p)
862 return static_cast<const numeric &>((new numeric(value * other.value))->
863 setflag(status_flags::dynallocated));
867 /** Numerical division method. Divides *this by argument and returns result as
868 * a numeric object on the heap. Use internally only for direct wrapping
869 * into an ex object, where the result would end up on the heap
872 * @exception overflow_error (division by zero) */
873 const numeric &numeric::div_dyn(const numeric &other) const
875 // Efficiency shortcut: trap the neutral element by pointer. This hack
876 // is supposed to keep the number of distinct numeric objects low.
879 if (cln::zerop(cln::the<cln::cl_N>(other.value)))
880 throw std::overflow_error("division by zero");
881 return static_cast<const numeric &>((new numeric(value / other.value))->
882 setflag(status_flags::dynallocated));
886 /** Numerical exponentiation. Raises *this to the power given as argument and
887 * returns result as a numeric object on the heap. Use internally only for
888 * direct wrapping into an ex object, where the result would end up on the
890 const numeric &numeric::power_dyn(const numeric &other) const
892 // Efficiency shortcut: trap the neutral exponent (first try by pointer, then
893 // try harder, since calls to cln::expt() below may return amazing results for
894 // floating point exponent 1.0).
895 if (&other==_num1_p || cln::equal(other.value, _num1_p->value))
898 if (cln::zerop(value)) {
899 if (cln::zerop(other.value))
900 throw std::domain_error("numeric::eval(): pow(0,0) is undefined");
901 else if (cln::zerop(cln::realpart(other.value)))
902 throw std::domain_error("numeric::eval(): pow(0,I) is undefined");
903 else if (cln::minusp(cln::realpart(other.value)))
904 throw std::overflow_error("numeric::eval(): division by zero");
908 return static_cast<const numeric &>((new numeric(cln::expt(value, other.value)))->
909 setflag(status_flags::dynallocated));
913 const numeric &numeric::operator=(int i)
915 return operator=(numeric(i));
919 const numeric &numeric::operator=(unsigned int i)
921 return operator=(numeric(i));
925 const numeric &numeric::operator=(long i)
927 return operator=(numeric(i));
931 const numeric &numeric::operator=(unsigned long i)
933 return operator=(numeric(i));
937 const numeric &numeric::operator=(double d)
939 return operator=(numeric(d));
943 const numeric &numeric::operator=(const char * s)
945 return operator=(numeric(s));
949 /** Inverse of a number. */
950 const numeric numeric::inverse() const
952 if (cln::zerop(value))
953 throw std::overflow_error("numeric::inverse(): division by zero");
954 return numeric(cln::recip(value));
957 /** Return the step function of a numeric. The imaginary part of it is
958 * ignored because the step function is generally considered real but
959 * a numeric may develop a small imaginary part due to rounding errors.
961 numeric numeric::step() const
962 { cln::cl_R r = cln::realpart(value);
970 /** Return the complex half-plane (left or right) in which the number lies.
971 * csgn(x)==0 for x==0, csgn(x)==1 for Re(x)>0 or Re(x)=0 and Im(x)>0,
972 * csgn(x)==-1 for Re(x)<0 or Re(x)=0 and Im(x)<0.
974 * @see numeric::compare(const numeric &other) */
975 int numeric::csgn() const
977 if (cln::zerop(value))
979 cln::cl_R r = cln::realpart(value);
980 if (!cln::zerop(r)) {
986 if (cln::plusp(cln::imagpart(value)))
994 /** This method establishes a canonical order on all numbers. For complex
995 * numbers this is not possible in a mathematically consistent way but we need
996 * to establish some order and it ought to be fast. So we simply define it
997 * to be compatible with our method csgn.
999 * @return csgn(*this-other)
1000 * @see numeric::csgn() */
1001 int numeric::compare(const numeric &other) const
1003 // Comparing two real numbers?
1004 if (cln::instanceof(value, cln::cl_R_ring) &&
1005 cln::instanceof(other.value, cln::cl_R_ring))
1006 // Yes, so just cln::compare them
1007 return cln::compare(cln::the<cln::cl_R>(value), cln::the<cln::cl_R>(other.value));
1009 // No, first cln::compare real parts...
1010 cl_signean real_cmp = cln::compare(cln::realpart(value), cln::realpart(other.value));
1013 // ...and then the imaginary parts.
1014 return cln::compare(cln::imagpart(value), cln::imagpart(other.value));
1019 bool numeric::is_equal(const numeric &other) const
1021 return cln::equal(value, other.value);
1025 /** True if object is zero. */
1026 bool numeric::is_zero() const
1028 return cln::zerop(value);
1032 /** True if object is not complex and greater than zero. */
1033 bool numeric::is_positive() const
1035 if (cln::instanceof(value, cln::cl_R_ring)) // real?
1036 return cln::plusp(cln::the<cln::cl_R>(value));
1041 /** True if object is not complex and less than zero. */
1042 bool numeric::is_negative() const
1044 if (cln::instanceof(value, cln::cl_R_ring)) // real?
1045 return cln::minusp(cln::the<cln::cl_R>(value));
1050 /** True if object is a non-complex integer. */
1051 bool numeric::is_integer() const
1053 return cln::instanceof(value, cln::cl_I_ring);
1057 /** True if object is an exact integer greater than zero. */
1058 bool numeric::is_pos_integer() const
1060 return (cln::instanceof(value, cln::cl_I_ring) && cln::plusp(cln::the<cln::cl_I>(value)));
1064 /** True if object is an exact integer greater or equal zero. */
1065 bool numeric::is_nonneg_integer() const
1067 return (cln::instanceof(value, cln::cl_I_ring) && !cln::minusp(cln::the<cln::cl_I>(value)));
1071 /** True if object is an exact even integer. */
1072 bool numeric::is_even() const
1074 return (cln::instanceof(value, cln::cl_I_ring) && cln::evenp(cln::the<cln::cl_I>(value)));
1078 /** True if object is an exact odd integer. */
1079 bool numeric::is_odd() const
1081 return (cln::instanceof(value, cln::cl_I_ring) && cln::oddp(cln::the<cln::cl_I>(value)));
1085 /** Probabilistic primality test.
1087 * @return true if object is exact integer and prime. */
1088 bool numeric::is_prime() const
1090 return (cln::instanceof(value, cln::cl_I_ring) // integer?
1091 && cln::plusp(cln::the<cln::cl_I>(value)) // positive?
1092 && cln::isprobprime(cln::the<cln::cl_I>(value)));
1096 /** True if object is an exact rational number, may even be complex
1097 * (denominator may be unity). */
1098 bool numeric::is_rational() const
1100 return cln::instanceof(value, cln::cl_RA_ring);
1104 /** True if object is a real integer, rational or float (but not complex). */
1105 bool numeric::is_real() const
1107 return cln::instanceof(value, cln::cl_R_ring);
1111 bool numeric::operator==(const numeric &other) const
1113 return cln::equal(value, other.value);
1117 bool numeric::operator!=(const numeric &other) const
1119 return !cln::equal(value, other.value);
1123 /** True if object is element of the domain of integers extended by I, i.e. is
1124 * of the form a+b*I, where a and b are integers. */
1125 bool numeric::is_cinteger() const
1127 if (cln::instanceof(value, cln::cl_I_ring))
1129 else if (!this->is_real()) { // complex case, handle n+m*I
1130 if (cln::instanceof(cln::realpart(value), cln::cl_I_ring) &&
1131 cln::instanceof(cln::imagpart(value), cln::cl_I_ring))
1138 /** True if object is an exact rational number, may even be complex
1139 * (denominator may be unity). */
1140 bool numeric::is_crational() const
1142 if (cln::instanceof(value, cln::cl_RA_ring))
1144 else if (!this->is_real()) { // complex case, handle Q(i):
1145 if (cln::instanceof(cln::realpart(value), cln::cl_RA_ring) &&
1146 cln::instanceof(cln::imagpart(value), cln::cl_RA_ring))
1153 /** Numerical comparison: less.
1155 * @exception invalid_argument (complex inequality) */
1156 bool numeric::operator<(const numeric &other) const
1158 if (this->is_real() && other.is_real())
1159 return (cln::the<cln::cl_R>(value) < cln::the<cln::cl_R>(other.value));
1160 throw std::invalid_argument("numeric::operator<(): complex inequality");
1164 /** Numerical comparison: less or equal.
1166 * @exception invalid_argument (complex inequality) */
1167 bool numeric::operator<=(const numeric &other) const
1169 if (this->is_real() && other.is_real())
1170 return (cln::the<cln::cl_R>(value) <= cln::the<cln::cl_R>(other.value));
1171 throw std::invalid_argument("numeric::operator<=(): complex inequality");
1175 /** Numerical comparison: greater.
1177 * @exception invalid_argument (complex inequality) */
1178 bool numeric::operator>(const numeric &other) const
1180 if (this->is_real() && other.is_real())
1181 return (cln::the<cln::cl_R>(value) > cln::the<cln::cl_R>(other.value));
1182 throw std::invalid_argument("numeric::operator>(): complex inequality");
1186 /** Numerical comparison: greater or equal.
1188 * @exception invalid_argument (complex inequality) */
1189 bool numeric::operator>=(const numeric &other) const
1191 if (this->is_real() && other.is_real())
1192 return (cln::the<cln::cl_R>(value) >= cln::the<cln::cl_R>(other.value));
1193 throw std::invalid_argument("numeric::operator>=(): complex inequality");
1197 /** Converts numeric types to machine's int. You should check with
1198 * is_integer() if the number is really an integer before calling this method.
1199 * You may also consider checking the range first. */
1200 int numeric::to_int() const
1202 GINAC_ASSERT(this->is_integer());
1203 return cln::cl_I_to_int(cln::the<cln::cl_I>(value));
1207 /** Converts numeric types to machine's long. You should check with
1208 * is_integer() if the number is really an integer before calling this method.
1209 * You may also consider checking the range first. */
1210 long numeric::to_long() const
1212 GINAC_ASSERT(this->is_integer());
1213 return cln::cl_I_to_long(cln::the<cln::cl_I>(value));
1217 /** Converts numeric types to machine's double. You should check with is_real()
1218 * if the number is really not complex before calling this method. */
1219 double numeric::to_double() const
1221 GINAC_ASSERT(this->is_real());
1222 return cln::double_approx(cln::realpart(value));
1226 /** Returns a new CLN object of type cl_N, representing the value of *this.
1227 * This method may be used when mixing GiNaC and CLN in one project.
1229 cln::cl_N numeric::to_cl_N() const
1235 /** Real part of a number. */
1236 const numeric numeric::real() const
1238 return numeric(cln::realpart(value));
1242 /** Imaginary part of a number. */
1243 const numeric numeric::imag() const
1245 return numeric(cln::imagpart(value));
1249 /** Numerator. Computes the numerator of rational numbers, rationalized
1250 * numerator of complex if real and imaginary part are both rational numbers
1251 * (i.e numer(4/3+5/6*I) == 8+5*I), the number carrying the sign in all other
1253 const numeric numeric::numer() const
1255 if (cln::instanceof(value, cln::cl_I_ring))
1256 return numeric(*this); // integer case
1258 else if (cln::instanceof(value, cln::cl_RA_ring))
1259 return numeric(cln::numerator(cln::the<cln::cl_RA>(value)));
1261 else if (!this->is_real()) { // complex case, handle Q(i):
1262 const cln::cl_RA r = cln::the<cln::cl_RA>(cln::realpart(value));
1263 const cln::cl_RA i = cln::the<cln::cl_RA>(cln::imagpart(value));
1264 if (cln::instanceof(r, cln::cl_I_ring) && cln::instanceof(i, cln::cl_I_ring))
1265 return numeric(*this);
1266 if (cln::instanceof(r, cln::cl_I_ring) && cln::instanceof(i, cln::cl_RA_ring))
1267 return numeric(cln::complex(r*cln::denominator(i), cln::numerator(i)));
1268 if (cln::instanceof(r, cln::cl_RA_ring) && cln::instanceof(i, cln::cl_I_ring))
1269 return numeric(cln::complex(cln::numerator(r), i*cln::denominator(r)));
1270 if (cln::instanceof(r, cln::cl_RA_ring) && cln::instanceof(i, cln::cl_RA_ring)) {
1271 const cln::cl_I s = cln::lcm(cln::denominator(r), cln::denominator(i));
1272 return numeric(cln::complex(cln::numerator(r)*(cln::exquo(s,cln::denominator(r))),
1273 cln::numerator(i)*(cln::exquo(s,cln::denominator(i)))));
1276 // at least one float encountered
1277 return numeric(*this);
1281 /** Denominator. Computes the denominator of rational numbers, common integer
1282 * denominator of complex if real and imaginary part are both rational numbers
1283 * (i.e denom(4/3+5/6*I) == 6), one in all other cases. */
1284 const numeric numeric::denom() const
1286 if (cln::instanceof(value, cln::cl_I_ring))
1287 return *_num1_p; // integer case
1289 if (cln::instanceof(value, cln::cl_RA_ring))
1290 return numeric(cln::denominator(cln::the<cln::cl_RA>(value)));
1292 if (!this->is_real()) { // complex case, handle Q(i):
1293 const cln::cl_RA r = cln::the<cln::cl_RA>(cln::realpart(value));
1294 const cln::cl_RA i = cln::the<cln::cl_RA>(cln::imagpart(value));
1295 if (cln::instanceof(r, cln::cl_I_ring) && cln::instanceof(i, cln::cl_I_ring))
1297 if (cln::instanceof(r, cln::cl_I_ring) && cln::instanceof(i, cln::cl_RA_ring))
1298 return numeric(cln::denominator(i));
1299 if (cln::instanceof(r, cln::cl_RA_ring) && cln::instanceof(i, cln::cl_I_ring))
1300 return numeric(cln::denominator(r));
1301 if (cln::instanceof(r, cln::cl_RA_ring) && cln::instanceof(i, cln::cl_RA_ring))
1302 return numeric(cln::lcm(cln::denominator(r), cln::denominator(i)));
1304 // at least one float encountered
1309 /** Size in binary notation. For integers, this is the smallest n >= 0 such
1310 * that -2^n <= x < 2^n. If x > 0, this is the unique n > 0 such that
1311 * 2^(n-1) <= x < 2^n.
1313 * @return number of bits (excluding sign) needed to represent that number
1314 * in two's complement if it is an integer, 0 otherwise. */
1315 int numeric::int_length() const
1317 if (cln::instanceof(value, cln::cl_I_ring))
1318 return cln::integer_length(cln::the<cln::cl_I>(value));
1327 /** Imaginary unit. This is not a constant but a numeric since we are
1328 * natively handing complex numbers anyways, so in each expression containing
1329 * an I it is automatically eval'ed away anyhow. */
1330 const numeric I = numeric(cln::complex(cln::cl_I(0),cln::cl_I(1)));
1333 /** Exponential function.
1335 * @return arbitrary precision numerical exp(x). */
1336 const numeric exp(const numeric &x)
1338 return cln::exp(x.to_cl_N());
1342 /** Natural logarithm.
1344 * @param x complex number
1345 * @return arbitrary precision numerical log(x).
1346 * @exception pole_error("log(): logarithmic pole",0) */
1347 const numeric log(const numeric &x)
1350 throw pole_error("log(): logarithmic pole",0);
1351 return cln::log(x.to_cl_N());
1355 /** Numeric sine (trigonometric function).
1357 * @return arbitrary precision numerical sin(x). */
1358 const numeric sin(const numeric &x)
1360 return cln::sin(x.to_cl_N());
1364 /** Numeric cosine (trigonometric function).
1366 * @return arbitrary precision numerical cos(x). */
1367 const numeric cos(const numeric &x)
1369 return cln::cos(x.to_cl_N());
1373 /** Numeric tangent (trigonometric function).
1375 * @return arbitrary precision numerical tan(x). */
1376 const numeric tan(const numeric &x)
1378 return cln::tan(x.to_cl_N());
1382 /** Numeric inverse sine (trigonometric function).
1384 * @return arbitrary precision numerical asin(x). */
1385 const numeric asin(const numeric &x)
1387 return cln::asin(x.to_cl_N());
1391 /** Numeric inverse cosine (trigonometric function).
1393 * @return arbitrary precision numerical acos(x). */
1394 const numeric acos(const numeric &x)
1396 return cln::acos(x.to_cl_N());
1402 * @param x complex number
1404 * @exception pole_error("atan(): logarithmic pole",0) */
1405 const numeric atan(const numeric &x)
1408 x.real().is_zero() &&
1409 abs(x.imag()).is_equal(*_num1_p))
1410 throw pole_error("atan(): logarithmic pole",0);
1411 return cln::atan(x.to_cl_N());
1417 * @param x real number
1418 * @param y real number
1419 * @return atan(y/x) */
1420 const numeric atan(const numeric &y, const numeric &x)
1422 if (x.is_real() && y.is_real())
1423 return cln::atan(cln::the<cln::cl_R>(x.to_cl_N()),
1424 cln::the<cln::cl_R>(y.to_cl_N()));
1426 throw std::invalid_argument("atan(): complex argument");
1430 /** Numeric hyperbolic sine (trigonometric function).
1432 * @return arbitrary precision numerical sinh(x). */
1433 const numeric sinh(const numeric &x)
1435 return cln::sinh(x.to_cl_N());
1439 /** Numeric hyperbolic cosine (trigonometric function).
1441 * @return arbitrary precision numerical cosh(x). */
1442 const numeric cosh(const numeric &x)
1444 return cln::cosh(x.to_cl_N());
1448 /** Numeric hyperbolic tangent (trigonometric function).
1450 * @return arbitrary precision numerical tanh(x). */
1451 const numeric tanh(const numeric &x)
1453 return cln::tanh(x.to_cl_N());
1457 /** Numeric inverse hyperbolic sine (trigonometric function).
1459 * @return arbitrary precision numerical asinh(x). */
1460 const numeric asinh(const numeric &x)
1462 return cln::asinh(x.to_cl_N());
1466 /** Numeric inverse hyperbolic cosine (trigonometric function).
1468 * @return arbitrary precision numerical acosh(x). */
1469 const numeric acosh(const numeric &x)
1471 return cln::acosh(x.to_cl_N());
1475 /** Numeric inverse hyperbolic tangent (trigonometric function).
1477 * @return arbitrary precision numerical atanh(x). */
1478 const numeric atanh(const numeric &x)
1480 return cln::atanh(x.to_cl_N());
1484 /*static cln::cl_N Li2_series(const ::cl_N &x,
1485 const ::float_format_t &prec)
1487 // Note: argument must be in the unit circle
1488 // This is very inefficient unless we have fast floating point Bernoulli
1489 // numbers implemented!
1490 cln::cl_N c1 = -cln::log(1-x);
1492 // hard-wire the first two Bernoulli numbers
1493 cln::cl_N acc = c1 - cln::square(c1)/4;
1495 cln::cl_F pisq = cln::square(cln::cl_pi(prec)); // pi^2
1496 cln::cl_F piac = cln::cl_float(1, prec); // accumulator: pi^(2*i)
1498 c1 = cln::square(c1);
1502 aug = c2 * (*(bernoulli(numeric(2*i)).clnptr())) / cln::factorial(2*i+1);
1503 // aug = c2 * cln::cl_I(i%2 ? 1 : -1) / cln::cl_I(2*i+1) * cln::cl_zeta(2*i, prec) / piac / (cln::cl_I(1)<<(2*i-1));
1506 } while (acc != acc+aug);
1510 /** Numeric evaluation of Dilogarithm within circle of convergence (unit
1511 * circle) using a power series. */
1512 static cln::cl_N Li2_series(const cln::cl_N &x,
1513 const cln::float_format_t &prec)
1515 // Note: argument must be in the unit circle
1517 cln::cl_N num = cln::complex(cln::cl_float(1, prec), 0);
1522 den = den + i; // 1, 4, 9, 16, ...
1526 } while (acc != acc+aug);
1530 /** Folds Li2's argument inside a small rectangle to enhance convergence. */
1531 static cln::cl_N Li2_projection(const cln::cl_N &x,
1532 const cln::float_format_t &prec)
1534 const cln::cl_R re = cln::realpart(x);
1535 const cln::cl_R im = cln::imagpart(x);
1536 if (re > cln::cl_F(".5"))
1537 // zeta(2) - Li2(1-x) - log(x)*log(1-x)
1539 - Li2_series(1-x, prec)
1540 - cln::log(x)*cln::log(1-x));
1541 if ((re <= 0 && cln::abs(im) > cln::cl_F(".75")) || (re < cln::cl_F("-.5")))
1542 // -log(1-x)^2 / 2 - Li2(x/(x-1))
1543 return(- cln::square(cln::log(1-x))/2
1544 - Li2_series(x/(x-1), prec));
1545 if (re > 0 && cln::abs(im) > cln::cl_LF(".75"))
1546 // Li2(x^2)/2 - Li2(-x)
1547 return(Li2_projection(cln::square(x), prec)/2
1548 - Li2_projection(-x, prec));
1549 return Li2_series(x, prec);
1552 /** Numeric evaluation of Dilogarithm. The domain is the entire complex plane,
1553 * the branch cut lies along the positive real axis, starting at 1 and
1554 * continuous with quadrant IV.
1556 * @return arbitrary precision numerical Li2(x). */
1557 const numeric Li2(const numeric &x)
1562 // what is the desired float format?
1563 // first guess: default format
1564 cln::float_format_t prec = cln::default_float_format;
1565 const cln::cl_N value = x.to_cl_N();
1566 // second guess: the argument's format
1567 if (!x.real().is_rational())
1568 prec = cln::float_format(cln::the<cln::cl_F>(cln::realpart(value)));
1569 else if (!x.imag().is_rational())
1570 prec = cln::float_format(cln::the<cln::cl_F>(cln::imagpart(value)));
1572 if (value==1) // may cause trouble with log(1-x)
1573 return cln::zeta(2, prec);
1575 if (cln::abs(value) > 1)
1576 // -log(-x)^2 / 2 - zeta(2) - Li2(1/x)
1577 return(- cln::square(cln::log(-value))/2
1578 - cln::zeta(2, prec)
1579 - Li2_projection(cln::recip(value), prec));
1581 return Li2_projection(x.to_cl_N(), prec);
1585 /** Numeric evaluation of Riemann's Zeta function. Currently works only for
1586 * integer arguments. */
1587 const numeric zeta(const numeric &x)
1589 // A dirty hack to allow for things like zeta(3.0), since CLN currently
1590 // only knows about integer arguments and zeta(3).evalf() automatically
1591 // cascades down to zeta(3.0).evalf(). The trick is to rely on 3.0-3
1592 // being an exact zero for CLN, which can be tested and then we can just
1593 // pass the number casted to an int:
1595 const int aux = (int)(cln::double_approx(cln::the<cln::cl_R>(x.to_cl_N())));
1596 if (cln::zerop(x.to_cl_N()-aux))
1597 return cln::zeta(aux);
1602 class lanczos_coeffs
1606 bool sufficiently_accurate(int digits);
1607 int get_order() const { return current_vector->size(); }
1608 cln::cl_N calc_lanczos_A(const cln::cl_N &) const;
1610 // coeffs[0] is used in case Digits <= 20.
1611 // coeffs[1] is used in case Digits <= 50.
1612 // coeffs[2] is used in case Digits <= 100.
1613 // coeffs[3] is used in case Digits <= 200.
1614 static std::vector<cln::cl_N> *coeffs;
1615 // Pointer to the vector that is currently in use.
1616 std::vector<cln::cl_N> *current_vector;
1619 std::vector<cln::cl_N>* lanczos_coeffs::coeffs = 0;
1621 bool lanczos_coeffs::sufficiently_accurate(int digits)
1623 current_vector = &(coeffs[0]);
1627 current_vector = &(coeffs[1]);
1631 current_vector = &(coeffs[2]);
1635 current_vector = &(coeffs[3]);
1641 cln::cl_N lanczos_coeffs::calc_lanczos_A(const cln::cl_N &x) const
1643 cln::cl_N A = (*current_vector)[0];
1644 int size = current_vector->size();
1645 for (int i=1; i<size; ++i)
1646 A = A + (*current_vector)[i]/(x+cln::cl_I(-1+i));
1650 // The values in this function have been calculated using the program
1651 // lanczos.cpp in the directory doc/examples. If you want to add more
1652 // digits, be sure to read the comments in that file.
1653 lanczos_coeffs::lanczos_coeffs()
1656 /* Use four different arrays for different accuracies. */
1657 coeffs = new std::vector<cln::cl_N>[4];
1658 std::vector<cln::cl_N> coeffs_12(12);
1659 /* twelve coefficients follow. */
1660 coeffs_12[0] = "1.000000000000000002194974863102775496587";
1661 coeffs_12[1] = "133550.502942477423232096703994753698903";
1662 coeffs_12[2] = "-492930.93529936026920053070245469905582";
1663 coeffs_12[3] = "741287.473697611642492293025524275986598";
1664 coeffs_12[4] = "-585097.37760399665198416642641725036094";
1665 coeffs_12[5] = "260425.270330385275465083772352301818652";
1666 coeffs_12[6] = "-65413.3533961142651069690504470463782994";
1667 coeffs_12[7] = "8801.45963508441793636152568413199291892";
1668 coeffs_12[8] = "-564.805024129362118607692062642312799553";
1669 coeffs_12[9] = "13.80379833961490898061357227729422691903";
1670 coeffs_12[10] = "-0.0807817619724537563116612761921260762075";
1671 coeffs_12[11] = "3.47974801622326717770813986587340515986E-5";
1672 coeffs[0].swap(coeffs_12);
1673 std::vector<cln::cl_N> coeffs_30(30);
1674 /* thirty coefficients follow. */
1675 coeffs_30[0] = "1.0000000000000000000000000000000000000000000000445658922238202528026977308762";
1676 coeffs_30[1] = "1.40445649204966682962030786915579421135474600150789821268713805046080310901683E13";
1677 coeffs_30[2] = "-1.4473384178280338809560100504713144673757322488310852336205875273000116908753E14";
1678 coeffs_30[3] = "6.9392104219998816400402602197781299548036066538116472480223222192156630720206E14";
1679 coeffs_30[4] = "-2.05552680548452350127164925238339710431333013110755662640014074226849466382297E15";
1680 coeffs_30[5] = "4.21346047774975891986783355395961145235696863271597017695734168781011785582523E15";
1681 coeffs_30[6] = "-6.3439111294220458481092019992445750626799029041090235945435769621790257585491E15";
1682 coeffs_30[7] = "7.2684029986336427327225410026373012514882246322145965580608264703248155838791E15";
1683 coeffs_30[8] = "-6.4784969409198000751978874152931803231807770528527455966624850088042561231024E15";
1684 coeffs_30[9] = "4.5545745239457403086706103662737668418631761744785802123770605916210445083544E15";
1685 coeffs_30[10] = "-2.54592491966737919409139938046543941491145224466411852277136834553178078105403E15";
1686 coeffs_30[11] = "1.1356718195163150156198936885250451780214219874255251444701005988134747787666E15";
1687 coeffs_30[12] = "-4.04275236298036712070700727222520609783336229393218886420197964965371362011123E14";
1688 coeffs_30[13] = "1.14472757259832757229433124273590647229089622322597383276758880048004748372644E14";
1689 coeffs_30[14] = "-2.56166271828342920179612184110684658183432315551120625854181503468327037516717E13";
1690 coeffs_30[15] = "4.4861708254018935131376878973710146069395814469656232761173409397653101421558E12";
1691 coeffs_30[16] = "-6.0657495816705687896607821799338217335976369800808791959096705890743701166037E11";
1692 coeffs_30[17] = "6.21975328147406581536747878587069711930541459818297675578654403265380823122363E10";
1693 coeffs_30[18] = "-4.7255003764027411113501086372508071116675161078057298991208060427341079636661E9";
1694 coeffs_30[19] = "2.5814613908651936680441351265410235295992556406609945442133129515256889464315E8";
1695 coeffs_30[20] = "-9752115.5047412418881417732027953903591189993329461844657371497174389592441887";
1696 coeffs_30[21] = "242056.60372411758318197954509546521913927205056839365620249547101194072057318";
1697 coeffs_30[22] = "-3686.17673045938850138289555088011327333352145765167200561022138925168680049115";
1698 coeffs_30[23] = "31.3494924501834034405048975310989414795238339283146314931357877820190435258517";
1699 coeffs_30[24] = "-0.130254774344853676030752542814176943723937677940441021884132211221409382350105";
1700 coeffs_30[25] = "2.16625679868432886771581352257834967866602495378408740265571976698475288337338E-4";
1701 coeffs_30[26] = "-1.05077239977528252603869373455592388508233760416601143477182890107978206726294E-7";
1702 coeffs_30[27] = "8.5728436055212340846907439451102962820713733082683634385104363203776378266115E-12";
1703 coeffs_30[28] = "-3.9175430218003196379961975369936752665267219444417121562332986822123821080906E-17";
1704 coeffs_30[29] = "1.06841715008998384033789050831892757796251622802680860264598247667384268519263E-24";
1705 coeffs[1].swap(coeffs_30);
1706 std::vector<cln::cl_N> coeffs_60(60);
1707 /* sixty coefficients follow. */
1708 coeffs_60[0] = "1.000000000000000000000000000000000000000000000000000000000000000000000000000000000000007301368866363013444179014835363181183419450549774";
1709 coeffs_60[1] = "2.13152397525281235754468356918725048606852617746577461250754322057711822075135461598274984226013367948201688447853106595646692682568953E26";
1710 coeffs_60[2] = "-4.548529924829267669336610112411669181387790087825260737133755173032543313325682598833009521765336124891170163525664509845740222794717604E27";
1711 coeffs_60[3] = "4.6879437426294973235875133160595324795437824160731608900005486977197800919261614723948577079551305728583507312310069280623018775850412E28";
1712 coeffs_60[4] = "-3.10861265267020467624457768823845414206135580030123228715133927538323570190367768297139526311161786169387040978744732051184844409191231E29";
1713 coeffs_60[5] = "1.490599577483981276717037178787147902256911799467742317379590487947009001487476793680630580522955117318124168494382267800788736334308E30";
1714 coeffs_60[6] = "-5.50755504045738806940255910881807353185463857314393682608295373644157298562106198431098170107741597645409216199785852260920496247655646E30";
1715 coeffs_60[7] = "1.631668518639067070100242032960081591016027803392225476881353619523143028349554534276268195490790113905102273979193269720381236708853746E31";
1716 coeffs_60[8] = "-3.9823057865511431381368541930378720290638930941334849821428293955264049587073723565727061718251925950255036781219414607001763225298119E31";
1717 coeffs_60[9] = "8.16425963140638737297557821827674142140347732117757126331775708561852858085860735359056658172512163756926693444882201094206795155146202E31";
1718 coeffs_60[10] = "-1.426548236351667330492229413193359354309705120770113917370333660827270957172393778178051742077714657388432785747112574456061555034588373E32";
1719 coeffs_60[11] = "2.14821861694536170414714365485614715949416083667308573285807894910742621740039595483105992136915471547998283891842897000924199509164799E32";
1720 coeffs_60[12] = "-2.81233281290021706519566203146379395136352592819625378308636458418501787286411189089807465993150834399778687427813779950602826375635436E32";
1721 coeffs_60[13] = "3.222783358826786224404373038021509245352188734386849874296356404770508945395436142634892645963851510893216093037595555902121365717716154E32";
1722 coeffs_60[14] = "-3.250409075716999887328836263791911196138647661969351655925350981785153422033954649154242209471752219326556302767677017396179477496948985E32";
1723 coeffs_60[15] = "2.897783210826628399578158893643627107049805015801395657097255344786041806868455726759715576609013221857885740543509045196763816109465777E32";
1724 coeffs_60[16] = "-2.29136919195969647663887561122314618826917230275433296293059354280077561407373070937197721317435316121212106870152659174216557412788874E32";
1725 coeffs_60[17] = "1.611288006928200619663496306945576194382628760891807800193737346171844871295031418730500946186238469256168610033434708290528870722514911E32";
1726 coeffs_60[18] = "-1.009632466053186015034182792930705530447465885425278324598880797572411588461783484686932989855033967294215840157892487264656571258327313E32";
1727 coeffs_60[19] = "5.64520651042784179741815642438421132518008517154942873706221206276337451930555926854271086501686252334516011905237101877044320182980053E31";
1728 coeffs_60[20] = "-2.81912877441595327683492797147781153304080114512116755424671954256427789550109614317215500473322621746416096887803928883800132453510579E31";
1729 coeffs_60[21] = "1.257934257434294354026338893625531254891110662111965279263894740714811495074726866375858553579650295684850594211744093582249745250079168E31";
1730 coeffs_60[22] = "-5.01544407232599962845688086323662774702854661522104499328570796808858930542190600193190967249971520736397504227594619670310759235566195E30";
1731 coeffs_60[23] = "1.786035425040937365122699272239542501767986628253845452136132211710520249195280548478081559036323184490150479070929923213045153333111476E30";
1732 coeffs_60[24] = "-5.67605430104368150038863866362066081946938075036837029856903803768657069745962581310398542442108872722631658677177822712376500859930109E29";
1733 coeffs_60[25] = "1.607878222558573982505999018371559631909289246981490321219650132406126936263403946310818841465409950661433241956831540547593847161412447E29";
1734 coeffs_60[26] = "-4.05332042374309456146169816144083508836132423024788116321074411679252452773181941601763924562378611113519038766273534176937279867894066E28";
1735 coeffs_60[27] = "9.07493596543985672039002802030098143847503854224661484396413496012780904911929710460264147600378604646912175235271954302119768907744722E27";
1736 coeffs_60[28] = "-1.800074018924350353143489874038038169034914082090587278672411654146678304871125651069902339241049552886098125667720181441150399048551683E27";
1737 coeffs_60[29] = "3.154250688078046681602499411296013099183808016176992164829953752437167774310360166977972581670851790753785195101324694758021403186162394E26";
1738 coeffs_60[30] = "-4.86629244083379932983782216256143990390210226006560452979433243294026128577640975980482675864760717747936401374948595060083674140963469E25";
1739 coeffs_60[31] = "6.58428611248406176613133080039790689602908099995907522692286902207707012485115422092589779128693214784991500936878932461139361901566087E24";
1740 coeffs_60[32] = "-7.77846893445970039116628280774361378296946997639645747353868461156972352366479641995295874152354776734003001337605345817120316052066992E23";
1741 coeffs_60[33] = "7.98268735994772082084918485121285571015813651374688487489679943603727447378945977989630573952891101472578977333720105112837324185659362E22";
1742 coeffs_60[34] = "-7.07562692971089746095546542541499489835693326760069291570193808615779224025348460132750549389189539682228913778397783434269420284483726E21";
1743 coeffs_60[35] = "5.381346729881846847476909845563262674288431852755093265786345982700437823098162630059919716651136095720390719236493773958116646152386075E20";
1744 coeffs_60[36] = "-3.4856856542678356876484367392130359114150104987588151214926676834365219571876912071608359944324610844909103855562977795837329347647911E19";
1745 coeffs_60[37] = "1.90665542883474657677037950113781854248329048412482665873254624417996252139138481002200079466749149325431679310476862249520001277129217E18";
1746 coeffs_60[38] = "-8.72254994006151131395107200045641306281165826830744222866994799005490857259177347821280095689079457417603257537321939951004603693393316E16";
1747 coeffs_60[39] = "3.30066663941625244322555483012774856710545517350986120571194216206848716066355962922968824538055042855044917677713272771363157100391997E15";
1748 coeffs_60[40] = "-1.020092089391030771746960980075254826475625668908623135552682999358854102567810002206013823466362488147261886160954607897574298699485318E14";
1749 coeffs_60[41] = "2.537518136375035057088980117582986067754938584307761188810498418760131416720976321039509027979006220650166651208980823946300429957067604E12";
1750 coeffs_60[42] = "-4.99523339577986301543863423322168947825482352498610406809585164155176248614834684219539096936869521198401912030883142734471627752449382E10";
1751 coeffs_60[43] = "7.62961024898383965152735310352890448678585029645218309944823403624458716639413808284778269959424212699922000610764015063766429510499158E8";
1752 coeffs_60[44] = "-8834336.1370238009649936481782352367054397712953420330251745022286767420934395739052638862442455545176778475848478708230456099596423988";
1753 coeffs_60[45] = "75445.9196169409678879362111492280315111800786619928588067631801224813888137547544321383450353324917130013984795690223150786036557545929";
1754 coeffs_60[46] = "-459.8458738886001056822131294892698769439281099450630714273592488999986769567563218319365007529495798105783705491469742412340762305916056";
1755 coeffs_60[47] = "1.922366163948404706136462977961544621491268971185908661903800938507393909575693892375103171073678191394626251633433930639174604982075991";
1756 coeffs_60[48] = "-0.00524987734300376305383172698735851896799115189212445098242699916121836353753886238290792298378658233479210271064792489583846726184351881";
1757 coeffs_60[49] = "8.81521840386771771843311455937479573971716020932982441671173279504850522350287085310420429874536637110755391716691475171030099411021337E-6";
1758 coeffs_60[50] = "-8.42883518072336499031504944519862331274440110738275125460829656821173301216150526266773841539372995424665091651911614576906895281293397E-9";
1759 coeffs_60[51] = "4.1559932977982056953309753711587342647729282359841592558743510304569204546713517319749817560490538963802716194154620384631597656968764E-12";
1760 coeffs_60[52] = "-9.26494376646923216540342478135986593801117330292329759013854851055518195892306285985326338987592590319793280515888731024676428929933443E-16";
1761 coeffs_60[53] = "7.80165274836868312019654872701978288745672229459298320116385383568401529728308916875595120085091565550085090877341856355815270191309086E-20";
1762 coeffs_60[54] = "-1.922049272463411538721456378153955404697617250978865956250065913541261535132290272529565880980548519758359440057376306817458561627984943E-24";
1763 coeffs_60[55] = "9.46189821976955264154519811789356895736753858729897267240554901027053652869864043679401817030067356960879571432881603836052222728024736E-30";
1764 coeffs_60[56] = "-5.06814507370603015985813829025522226614719112357562650414521252967497371724973383019436312018485582224796590023220166954083973156538672E-36";
1765 coeffs_60[57] = "1.022249951013180267209479446016461291488484443236553319305574600271584296178678167457933405768832443689762998392188667506451117069946568E-43";
1766 coeffs_60[58] = "-1.158776990252157075591666544736990249102708476419363164106801472497162421792350234416969073422311477683246469337273059290064112071625785E-47";
1767 coeffs_60[59] = "4.27222387142756413870104074160770434521893587460314314301300261552300727494374933435001642531897059406263033431558827297492879960920275E-49";
1768 coeffs[2].swap(coeffs_60);
1769 std::vector<cln::cl_N> coeffs_120(120);
1770 /* 120 coefficients follow. */
1771 coeffs_120[0] = "1.0000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000060166025676976656004344991957470171590616719251813003320122316373430327091055571";
1772 coeffs_120[1] = "3.4497260317073952007403696383770947678893302981614719279265682622766639811173298171511730607823612517530376844024218507032522459279662180470113961839690189982241536061314319614353993672315096520499373373015802582693649149063603309572777186560148513524E52";
1773 coeffs_120[2] = "-1.4975581565000729527538170857594663742319328925831469933998274880997450758924704742659571258591716460336677591345828722528085692201176737000527729600671680178988361119859420301844184208079614468449296788394212801103162564922199859549237082372776667464E54";
1774 coeffs_120[3] = "3.1957762163065481328529158845807843312720427291703934903666695190945338610786360201875291048323381336567812569171891600400186742244091402566230953251621720778096033490814848238417212345597975915378369497445590090951446115848410773972658485451963575288E55";
1775 coeffs_120[4] = "-4.4689623509319752841609439083871154399631153121231062689347162975834499076693093642474289117173045421812089871506249999929076992135798925381959196225961791389783472385803138226317976820364502651110639008585046458007356178875618627927171581950486124233E56";
1776 coeffs_120[5] = "4.606068718424276543329442566011849623375399823565351941825685310847310447457609082356012685588953435307896055516214072529445026693975872604267789672469025113562486157850515006504573881812473997762948360804814769118883992998548055557441646946685125118E57";
1777 coeffs_120[6] = "-3.7314461146854666499272326592212099391213696621869706562566612605818861385928266960370453310708465394226398321257508947092784006446784523328681347046673172481746936234783770854350210504707173921547794426833735429199925024679815789545465854297845328325E58";
1778 coeffs_120[7] = "2.474425401670711256989398808079221298913654027234786607507813220440957186918973475366048940039541074278444160674001228864321389049663140487504402096319272526201782217412803784224929141788255724630940381342478088455751340159338461174261577243566175687E59";
1779 coeffs_120[8] = "-1.3811875718622847750042362590249762290599823842851465148429257970104907280458901604054390293828410620002370526629527048636126473391278330353375163563724888073254512227198849135923692811222561965740181944727170495185714496890490479692693474125883791901E60";
1780 coeffs_120[9] = "6.623089858532754482582703479109160446021743439335073883710993620625687271109284320721410901325182604938578905712329203551531862389936804947105415805829404869727743706364603519433193421234231031076682156125442577335383798263985569601899041876776866622E60";
1781 coeffs_120[10] = "-2.7709515004299938864490083840820063124223529009388282231525445615826433364331567602934962481829061542793349831611106716261513624279121506887680318284535361848032886450351898892264386237450622827397559067350672965967202437971930333676917000390477963866E61";
1782 coeffs_120[11] = "1.02386112293172223921263435003659366453292875147351461165091656394534393086780717052422266565203902889367201592668259202439166666819852985689989767402099479793087277263747942659943270101657408462079787397068550734516045511611701546009078868077038808757E62";
1783 coeffs_120[12] = "-3.3740197731917655541744976218513993073761175468772389726802124778433432226803314067431898210976006853342921093194297198044021414900546886804610561082663076825192459864843102368108908666053756409152492134638014803233805912009476407113691438596300794146E62";
1784 coeffs_120[13] = "9.996217786487670355655374796561399578704294298563457268841140703036898520360123177193155340144551120260016445533739357030180277693840431766824113840895797510199955331557143980793267795747200088810293047731873192410526786931879590684673414288653913515E62";
1785 coeffs_120[14] = "-2.6804750990199908441443350402311488850281543531194918304012545530803283220192092419107511475988099394746800512008906823331244710178292896561401750166818497729239682879419868799442954945496319510685448344062610897698253544876306888341881254056091234759E63";
1786 coeffs_120[15] = "6.5422964482833531603879610057815197301035372862466791995455246163778529556707384145891730234453157337303612060344197138180893720879196243783337539071284141345021864817147590781643393947019750353147151780290464319306645652085743359080495090595200531486E63";
1787 coeffs_120[16] = "-1.4604487304348366496825146715570516556564950771546738885215899741781982964860978993963272314092830563320794184042847908967120542212316261920409301852237223308467032419706968676861616456179895880956772385510853673982424825597152850339588189159102980666E64";
1788 coeffs_120[17] = "2.9942297466313630831467808691292548682230644559492580161942357031681185068971393754352871129412787966878287389513657398203481589163498279625760316093736277896138061249076616695157422053188087353540756151586375196486093987258640269607104978950906670704E64";
1789 coeffs_120[18] = "-5.658399283776588293772725313973093187743120982052603944865098913586526167668102733207163739469977271584007101869254711458133873627143366757941713180350370056955237604551850024423889291598422917971467957836705917204903687959901869098540153925178692732E64";
1790 coeffs_120[19] = "9.887368951584101622633538892976576123080629424367489037686110916264512731398396560326756128205833849608930564615629875435100785011872254223744155330328477703592008501954532369042429700051416733748454350165515933757314793533786385104271308839525639768E64";
1791 coeffs_120[20] = "-1.6019504550228766725078575508839635707919311420327486864048705642201106895239857903763208049376932672160478820626774934879424498715258948985194011690204294886396827446040036506699933786721588971678753877371518212675519147446728054067639530675249526082E65";
1792 coeffs_120[21] = "2.4124568469636899540706437405441629738413207418758399778576327598069435452295650039157974716832514441625728576753250737726840109004878753294786785674578138926529507088264657400701828947949531197915861820274684954206665488761473274445827472596875582911E65";
1793 coeffs_120[22] = "-3.3841653726400000079488483558717068873181168418395106876260246491163166726612427450773591871178866824643300679819366574162583413250423974373322308130319007820863363304629451933781204964221002853140392226489420463827400812929748772154909106349410663293E65";
1794 coeffs_120[23] = "4.4305670380812288478773282114598811227924298131011853412998479811262358077680067168455361591598296346480072528806092976336961470360354620203822421524751468329936930212919915114854135818230382164555078957880154875221176513434392525189922941290050575762E65";
1795 coeffs_120[24] = "-5.4228176962574428947233160003094662570284359565811627941401342797491445636152854865132166939274138115146035207618348708829039395974942115203986578386666664945394109693178927438991059414217518334491360514633536224841961444935232548483014691997071543828E65";
1796 coeffs_120[25] = "6.214554789078092267222051275213928685756510105900211846145778269883351640710249139978059486185007208670776100912863866582278800642692097830681092656540813877576256048148229340562594504915197956922387464825593941922429396202734006609196778697870436014E65";
1797 coeffs_120[26] = "-6.6773485088895517986512141063848395783979405189075416643094283756118912554557672721632998501682483143868731647507940026369035991063923616298815637819145806214374157182512600196214559297579802178103007615921637577873304407436850546650711237281572008424E65";
1798 coeffs_120[27] = "6.734925330317694704469314845373778479111077864464012553672292377883525864326847400954413754291163739900219432201437895152976917857427306427115230048061308424221525123820493252697918698598513232640014129066982507718245232516657455821629338155744427538E65";
1799 coeffs_120[28] = "-6.383582878496429871173501676061533991181960023885889537277705274319508246322757005217436814481703326467002683699047193244918123789600842413060331898515872574523803039779899326755393070345055586059441271293717500426377884349137309244757708993087958455E65";
1800 coeffs_120[29] = "5.6913529405959275511022780614007027176288843526260372650173869440228336395668389555081751187360483397341349300975285817498083216487282169140596290796279875175764991375447348355187090404486257481827615256024271536396461908482904537799521891879785332367E65";
1801 coeffs_120[30] = "-4.776996734587211249165031248400648409423153869394988746115380756083311986805300361459383722536698540926452976310737678416019979202990255666249869917768885659350216400547190883549730059461513588008706974008085270389354525600694962352952715682056375518E65";
1802 coeffs_120[31] = "3.7775367524287124255443145064623569295746034916892464094281613465046063954544055573214473155479196552309207209647540614474216985097792266203411723082566949978062697757983354600199199984244302856099811940389910544756210676400851240882142140969864764468E65";
1803 coeffs_120[32] = "-2.8161966171919236962021901287860232075259781334554793534017516884995332700369401674058517414969240048359891934178343992080557338603528540157030635217682829894098359736903943078409166055640608627322968554856315650475005062493399450913753277478547118352E65";
1804 coeffs_120[33] = "1.9804651678733327456903212258413521470612733719543558365536494344764973229749132899499862883369665827727506916597326744330471802598610837032598656197205238983585794266213317465548361566327435762497208877015986690267754534342053368396181078097467171858E65";
1805 coeffs_120[34] = "-1.3144275813663231527166312401997093907605894997476799416306355417933431514642211250592825223377757973148122542735038736133300194844844655961425683877005418926364412294006123974642296395931311307760050290069031276972832755406161248577410950671224318855E65";
1806 coeffs_120[35] = "8.2367260670024829522614096155108151082106397954565823313893008773930966293786646885943761866773022391428854862805955553810619924412431932999726399857050871862122529700098570542876369425991842818202826823540112018849926644955200888291063471724203391548E64";
1807 coeffs_120[36] = "-4.8749964750377069822933994525197085013480654713783888755556109773660249389776804499013517227967180500633060271953473316017147397601291325922904139209860429881054757911243087427393920494271315804033914011087815785282473032714919188637172020633929566123E64";
1808 coeffs_120[37] = "2.7259664773094932979328467102942769029907299417406744864696200699394594868759231280169149208728483197299648608091313447896342349454038879581019820193316159535211365363553004387852005780736869678460092714636910972426808304270369152189989142121207224142E64";
1809 coeffs_120[38] = "-1.440426226855027726783521340050349148103881707415523724377763633849488875095817796257895327883428230885349760692732068174527147156893314818583058727424251827006457849321094911262818557954829248070170426870959233263267490276774734065709978749400927185E64";
1810 coeffs_120[39] = "7.193790858249547212173205531149034887209275529426061411129294234841122474820371873361100215884757249851960370114629943083807936135915003201800204713978377250292881453568756354858194614039311248345228434431020394729104593125888325843724239404594830488E63";
1811 coeffs_120[40] = "-3.3960029336234301755324970935705944032408435186630159101426062821929524761770439420961993430248258136340087498829339209014794230274407979103789924433683527009234592433480445831820377517333956042612961562022604325181492952329031432513768020816986814393E63";
1812 coeffs_120[41] = "1.5154618904112106565112797443687014834429200069480460967081898435635890576815349145926430052596468033907024005478559584915319911380449387176530845634833237204659108290330613043367085829373476690728522550189678729181372902816898536141595215616716630939E63";
1813 coeffs_120[42] = "-6.3927647843464050458917092484911245813170740434503951669888756878206365814594631676413018245438405308353724023007754523096143775098898268650326908751515418318201372985246418468844138298345777180517875695389655616000832495210812684049030674085212697428E62";
1814 coeffs_120[43] = "2.5490394366379355452002449693074954071810215414182359403355645652443600688717811337587901850157210686351097591461582890354662732336749618027675479531031836144519267481752770036252137747675754903974915999567019837855523058289177148692481402871253211324E62";
1815 coeffs_120[44] = "-9.606466879185328464666445215840505657671157752044466089989040292763536710311599947887918708456526669882072519263973105599580140713596301388561639705589314111762600854460059589939760935803484446888352368360433606245369171819922425771642408570388554052E61";
1816 coeffs_120[45] = "3.4212392804723358445152430359637323789304939688937873921904941412927756295848104328630952153624979489607759834359194243032109828811134607612715016533909375981353098879969472700079242226099049323998286020341979178782935852542355220403299144612362244738E61";
1817 coeffs_120[46] = "-1.15119134701605919461057899755821946453925102458815313053351247263978303346790555715641513756644038607667203392289423834966320935498856390723555744530789850290369071103208529608463210398231590077340268751005311531529356083188150256469829678612245577446E61";
1818 coeffs_120[47] = "3.6588622583411432033523084711047679684233731128914152509273818448610176621874654252431411048902598388935105893946323641003087000410095802098177375492833543391040706755511234323104846636415419597151008153829618275459606044459923718022154035121167198784E60";
1819 coeffs_120[48] = "-1.0981148514467449476248066871827754422009180048705085132882492434176164929454140182025449006310206725429473330511884213470600326782740663313311256352613244044500057688932314549669435095761340307817735687643806167483576999980691227831561891265615422486E60";
1820 coeffs_120[49] = "3.110998209448997739767747906196101611409160829345058138064861244336130082424927251851805875584197897229644157110035272012393338413235208343342708685139492629786435072305986349067452739209758702078026647999828517440754895711519542954337931090643534216E59";
1821 coeffs_120[50] = "-8.3162485922574890007748232799240657004521608654422032389269811102140449056333167761296051794842882201869698963586030628312914066893199727852512779320175952962772072653493447297721128265231294406156925752496310087025926300388984242024436858845487466277E58";
1822 coeffs_120[51] = "2.0966904516945699848169820408710416999765756367767199815424586610234585829069218729220161654233351574517459523275756901094737085187558904179251813051891939079067686519817858153690134828671544815635956527611986498479411756457222935682849773436423295467E58";
1823 coeffs_120[52] = "-4.983121305881207125553776640558094509942884568949257704810973508397697839859902664482541160531856121365759763455699578413261749913567077796586919935391984240753355552646184306812426079133011894826183873855851966310877619118554510972675999316631346679E57";
1824 coeffs_120[53] = "1.1158023601951707374356047495258406415892974604387009613173591921419195864040428221070481312383179580486787822935456571355463718115785982888531393271665510645725283439572279946304699780331972095822869500426555507626639723865965516308476400920600382357E57";
1825 coeffs_120[54] = "-2.3524850615012075127499506758220926725372558166170912192116695445007095502575329450463479860779122789467638956004572617263549199692255055063165454868102165975951768676031140009643202074220557325155838768661030361538572755082660730808847591840060467064E56";
1826 coeffs_120[55] = "4.6669318431895615057208826641721251136909284138581355667925884903657855204100373961676117747969449100495897986226609480142908763981931305129946569690612924941456739524153327260627627771254850382983581593260532259539447965597396206625726656509884058042E55";
1827 coeffs_120[56] = "-8.7053773217442419007560462613131691749734845382618514999712446313788486289774350240165530159591402631439776213579542026449818009956904779042347595401565525081115611496250192338958392965746523979241969677734430475813057146574920495171984815351708574336E54";
1828 coeffs_120[57] = "1.5256552489620511464542280446639568546874380361953025589702692266626310669215652044048704882910412155084167930513006634430352568411276836880182348033924636960897794333644980768878022821035659978039286230061734024129667272393315169114199838321062607299E54";
1829 coeffs_120[58] = "-2.5099934505534008439782195609383796207770494575364994376922414269548303512602084430128307108303305643530918354709126474742035537827601791192999467996479881350277448357927640707861695639576629921988481117017137420422963638277868648516492581097660522547E53";
1830 coeffs_120[59] = "3.872963359882179682964169603201046384616694634651871844057456079738892419308420856725974686574980381399016464501318163662938118593626674643538005780375691959391996340141057698193381380484420715733863044826589570328349973407598034428591146829028071358E52";
1831 coeffs_120[60] = "-5.59947633823301408044455223877913062308847941596689956112764416031828413291312481723036534632655608672535030921469531903033364444816678754679807809159478411100820014592865068932440734964265842594875758737421026093110624848762070026616564150314951394E51";
1832 coeffs_120[61] = "7.57762861280525531438216991274899157834431478755285945898172885086150762425529113816148806028462888396660067975773261101497666568988246606837690320098870044112671149076084444095163491848634465373822951831018725769263871497616640732007420499659069842E50";
1833 coeffs_120[62] = "-9.587786106526273406187878833167940811862067040706459726637556599860244751467528905534431960251166924163661188573831350928972391892492380823531476387272791432306808700507685765850397294118719242350333451452137838374120658600691461454898577711260078952E49";
1834 coeffs_120[63] = "1.13288726401696728230264357306938076698155303500407071418573081766541065136778223998897791839613776442037036668986628122296219518360439574147622758002647495909592177914657175019781723803408732148262293125845657503039410078589916085532057725749397276232E49";
1835 coeffs_120[64] = "-1.24849787223197441956280303618704887038709792250544105638342097080498907831514597860418910331910245753340059089147824955071899315894649696314820492532126554883819507650973976145456660786429117569053901704116877128391672511345177517877672824534972448216E48";
1836 coeffs_120[65] = "1.2815463720972693091316233381473056495608681859925407504190742949467232967966271661733907550222983737930524555721493736920130260377888287772008209963158064973076933575966719577456540496444474944074979736374259087350416613616719928507635667369740203319E47";
1837 coeffs_120[66] = "-1.2234887340201843394744986892310393596065877342193196880417674427168862926389642850813687099959036354499094230765541977493433449153438766822382486040215211159359175689369230076522107734270943423777076523650345103234411047700646432924770659676420158487E46";
1838 coeffs_120[67] = "1.0847187881607033339631651118075716564835185723270640503055198532318419482330026641941088359447807553514405522074008969583213861070993661224871455023365601323302778638456843760403418046238489404394483720438784739822580385277055304353975028280477740796E45";
1839 coeffs_120[68] = "-8.9160881476675795743767277986448579964735858351472748620623279571408606135698760493224031735408212513500922230670883171668702983221921543376953865813604783695111225412173880768170509738290662806468458720236121755965944855709552219268353813402612336565E43";
1840 coeffs_120[69] = "6.782864920104031936272293608616215844503387641476821968620772153274069873138756405621471099960069602613619793775294358177761533027360002770186566164041138064221354961783144649476276625776241973967317262115970868665380343599565811072109785000646703404E42";
1841 coeffs_120[70] = "-4.7667808452660756441368384708874451089976319738852731080495062883240643961463680300964077232336439626019128672679703771884184482488932861160134911816225569323838390204451496983578077563176966732010513231048738892639707790407292070646798259086924770995E41";
1842 coeffs_120[71] = "3.0885057140860079424719232591765602418793465632939298397987628606701994268384966881159469651774584648643122830739130127593326652998108850492039117928976417052691273804304806596509726701594300563830431015215234640024338277573401498998072908815285293868E40";
1843 coeffs_120[72] = "-1.8410405906573614531857309495652487774337134256805076777639383854080936219680656594060736479739035202182601529001321266214227848431889644620036213870966329509961114940541333851155401637197303308322414678191211465563854205816313387785764908216851396633E39";
1844 coeffs_120[73] = "1.0073694433024942271325653907485159683302928496826793112696958500366488338508211620934892875328717073528902110227362794694820010124321343709182901273795782541866547318841893692957109947576483162095037812781379193423759617638948859880051822460818418552E38";
1845 coeffs_120[74] = "-5.0475051506252944853315611134428802424958512917967945464108691542854207821486654807141339210375899950551724141366521361887864357385178212628348794663127149312605456165451981719848656127310229221238908657530297751682848475855876378576874607521597136906E36";
1846 coeffs_120[75] = "2.3099766115359817610656986443137072041797751710805647712896098246833051023271876304983288225638204962631413469467959017768113430777226924099787875749611560913177631681394153889301715579572842026181746028117354815826836594637709952294015960031772162547E35";
1847 coeffs_120[76] = "-9.629053850440590569772960665435833408449876392175761493622541259322053209458881628458334353756739601360772251654643632187697620334088992038575944303101187678397564511853344433267011583960451100374611538881978045643233876974513962362084978095067025623E33";
1848 coeffs_120[77] = "3.6452126546120530579393646694066971671091434168707822859890104373691687449831950255953317231572802167174179528347370588567969602221261721708890001616085516755796796282628169745443137768549800602834096924025507345446292715781107949529692160434800323E32";
1849 coeffs_120[78] = "-1.2492564030201607643388368733220662634846470405464496879151879822123866671204541555507638492613046717628358162773937737774832271305618491107140304474323049182605167775847584622690299098207979849043605983558768056117581593008210986863088433891075743152E31";
1850 coeffs_120[79] = "3.8627447638297686357472526935538070834588578920414538227245516723308987020816841052950727259618753144711425856434270832495754300189881199851254605718213699755258867641301730599979474865704144160112269948588154919128986989885090481959424806312935273075E29";
1851 coeffs_120[80] = "-1.0736758703963497284148841547397192249226725101007524773889805877171959717011395181953504058502607435217886087332761920207901621377557079619638699346496468750455986591040017334237734940082333954589067611955107878899677189289648293223359861027746438121E28";
1852 coeffs_120[81] = "2.6722714785740082059347577649909834926335247252399259683264830680945466475595847553753509546415283809619181144796536494882020159787371993099998263815645014317923922311421330376008111312767167437401741178863083976628261471599264811824656877164988491393E26";
1853 coeffs_120[82] = "-5.9304047185329750657632568788530498935629656326502947505210292278638825286675833282579834326765999907183142489791905921257123760969245535649745876992946512033156167841406724363867902645010435996961270021857807247440211477908060243655541266857227638988E24";
1854 coeffs_120[83] = "1.16817022089143274700208191285335154155497013626172270535715899131321522799010543339535307798264602677955894930046454353008462671803498794203612585729705145312299224155123919877760274781582850868001155383467754608529345730226972329454404720862870618607E23";
1855 coeffs_120[84] = "-2.03239515657536501213472165328009690017090356606547792466197690386716728380893226886179282271040418637806139515373566132123131620086873213475424131345589653019635327048678766191769576650893957440830876852296666120473866301097954633389040518870395767125E21";
1856 coeffs_120[85] = "3.1065334503269182605978912331263087603258864771943471481540265718169544724355602987297631515907391374943512439350265433478241465606056187134785807375293801936399644663199667496663518171930757047012102683120173353568660795955174938680248863153863947508E19";
1857 coeffs_120[86] = "-4.1476244154347831048636005592317388215032295704489937704602030038303705695463546496640638505584602502764898113504560236629804442607426019604639559875021291459916615723777004493344143132459204229291886967479716413925814352313734234340863490128872380307E17";
1858 coeffs_120[87] = "4.8067293487250079673131214670887682215073707729621636364424152483295071605326220176372385638491275365750175037404843071051780212494354459897540110089573898336327006157766256896984455454193271731091632286742192439925748114360605084629432813597189767538E15";
1859 coeffs_120[88] = "-4.8023544548381246628003457039588616467438691159189277447469028024236284353593054364114519649309416187375157096932150251663679454372678125518452171003992957433311257042292636706448339781439297178835786059318810522834929923770539615271536113963729385909E13";
1860 coeffs_120[89] = "4.1055087514683476865343055835875083237542317413651906253058979029083965525058905726360233143503628224856307545474786181299719957472120906835233967660557875100202077212004953379299507351564181758434304881046845705855303854083493519588411179065109026834E11";
1861 coeffs_120[90] = "-2.9787503393847675871205038539267895335240592213878943742323972872214441728681744433089698206110260166068266926018988659692353298939109421567999207730700359726920482465669373553804927535369930188390246988033893916611435406224816632683980860607732310186E9";
1862 coeffs_120[91] = "1.8178328110729629877907010659834277046059726898311908447099830056830012488194646687474150289147446390570639168063598563291822008033517936194534129929881015025633519502485415000390171249019651579295905194415531994026553693578406432674734610095421683863E7";
1863 coeffs_120[92] = "-92391.136314434380495997449781381513978328604842061708454699991154771188446049720445502194923435235472458378926242100033122111143321209059959788378033220861638093951546784186137626553022963832352496255851690092415165826965388502958309163995296640164754";
1864 coeffs_120[93] = "386.82763074890451546182061419449593717951707520472938425276820204065379182568600735469831672149785863654956632602671563997131280046154927653332261114114005498875447205079045401364007035880825957300757663780618819785476980699579657587509130753204519233";
1865 coeffs_120[94] = "-1.3181204292571874302358432444324779303744749959754136019600954846045028319805074783759764870805734807693739252625657350494147444011046941331047057337345953605042408524072436811726898109072388160378243068564382623631658424851676817690976343859083960324";
1866 coeffs_120[95] = "0.003606538673252695455085947121496196507159591230095595764694813152630524319596509155920374890595867709349176662036024214476302717902368680224618116411588086562230407996267622244422187853090635901906175373997993725355114393033631058067900506212434600015";
1867 coeffs_120[96] = "-7.805244503909439374422205381130511738566245024242591464192744568789876715121004646510755612128565674260161510215430132815223049297785205382643947556846567064565241387424696940674258789227398935846571768027456535982674711768030751512030174841314425949E-6";
1868 coeffs_120[97] = "1.31373705470989377112938364152965446631228819123896570245455699237549295870321627234421140232628798373711221392827979836922621437205363811871692678679625916100572037589291239046725228767017131155814257944742981208252138821140381478767814046301821211856E-8";
1869 coeffs_120[98] = "-1.6872873094408224472617181717534409090015431593544429529131126514352910895332010213914243717484771690790552077128803350550170014347729272790464826195676369023970955260051387240496705602732313607409271794413329062030561818907163134089683283286623809325E-11";
1870 coeffs_120[99] = "1.6183083251905685095057354853863188515437903228178486856957070037813756492593759658405336450433607296873747595037080703825755020175480385843762609522889527239577435110258291566585028919336090916225831079571865425410181260759913688103716786795647286451E-14";
1871 coeffs_120[100] = "-1.13097359411474028225398794102354853670936316496817819635688647804142428962171772690717075128208102537660772310780986623575005236651312181907812813813504742701120603881086064664411899253566047514905519888629604717647221817372977488600336785871295304013E-17";
1872 coeffs_120[101] = "5.599216369109121957949255319730053610385733330502739423509794477602247233276045188197007198417289907263120960704056657544648432653622931077692740961599655386871075693202473992087883485704436336279135221721374640982826144708808646466699352755417123702E-21";
1873 coeffs_120[102] = "-1.9009180102993021108185348502624676395148544369474718879637745630712451378711342634099259114111847962752555305470572286326367888004493816251811794947276966269738750207359305252041104539066278002044545942171476984766923991983055271262414217352967659228E-24";
1874 coeffs_120[103] = "4.261262509940940316499754264112111685174274727656165126333137554124192224955656564229887938745508952447664695831728428607673797269945824475565104978593072684829487175697371245288754204324544164474840153141042852153497051337607734150135978754952561336E-28";
1875 coeffs_120[104] = "-6.033854291373449912236926137860325602686312455380825767485673949251953414778800668020214699151728472172651816317924130614791108454134597377848088327850505473503152696524861086193124979489104732214189466703901268332265826882296309653009237279831825243E-32";
1876 coeffs_120[105] = "5.1208402745272379096703574714836785944518835939702823617280147111145234914591060871138496110227453241036619229980622243972303295470574470937679143516006222494480144845809123492603651773613707216680534850900104861326332900592715684757980394834998321888E-36";
1877 coeffs_120[106] = "-2.4463535717946588550832618025289907099586319384566637643650142186828541109926588999585266911960640972919441499109750654299062004147686492034166034659422424525984094382368955916181276646903453872999065929058429821759475215620044891133652431220664754175E-40";
1878 coeffs_120[107] = "6.0973480699773886324239008989591793773608942051497498591908583910660358857815864266160341286217871697703362816166340947142517661604423899536979689047275448159991318658879804351288744125363072102852651926942302209139318098544348348564409845011546432615E-45";
1879 coeffs_120[108] = "-7.2234185761285078775026471720270426097727212523472472797635230392183067756271499246654638332288950167477129840028892565652782123508855602380279653475510712205780583313834027906297063690370430285856541927759405826980856379432703473274890527421175151858E-50";
1880 coeffs_120[109] = "3.6217112680215791206171182969894344487335819731880124290544082848140757826983885738735436324684863867140575000400288923606439193119990961489053513339202655922248092157737577138929144240507796562250602457839068582279379672722261563501188150876583184441E-55";
1881 coeffs_120[110] = "-6.6329300032795486066608594142675837603786558782159646987663521197523704085781830169369726460621246948945196657495305819768951424025780824076252490918306538895670861455244641773606980519824591785816943621538721352987553804824051051144609050417497894495E-61";
1882 coeffs_120[111] = "3.6664720904335295532012711597888717227860988776477301054518326674835421172405060906940404374163713097964932859351917152390238690399278248344863365606468942320103392909602843987855082225592776850615943708151738327210634139824601616072015258461809772448E-67";
1883 coeffs_120[112] = "-4.7466013179695826928232672846686064011594588664906398407027593213652099998530859940288723349213099851532139911079905393494419637612780994270110734378146177806681489226896952731800026849872070824592339117757940119304241732812925979963178130104280115315E-74";
1884 coeffs_120[113] = "1.0163707785221910939390789816391472677729665860532352695801597334766068288835382195560328979864550624486740471947632369344045378626680607890520366137741785540226552923584183986350590955499329375427326072319268396685478606934920507703868118038891818762E-81";
1885 coeffs_120[114] = "-3.4814151260242800905467399051937942442621710748397374123807284826536707678408888416026868585492229216524609739211131993326633970334388991812593549702868877534701822990946125111761892723042376117665640296993581745994557803052315791392349639065203872505E-90";
1886 coeffs_120[115] = "1.18525924288117432386770939895670573772658621857195305986011196724304231598127227408839423385042572374412446842112646168302015480830234100570192462192015131968307084609177540911503689228342834030959242458698413980031135644018348590823980902427540799814E-91";
1887 coeffs_120[116] = "-8.5714961216566153236700116412888006837408819915951896129362859520462766617634320531162919426026429378433105901035364956643086394331335747930198070611009941831387116980941022864465946989065467218665543814574849964435089931072761832853235509961870476035E-93";
1888 coeffs_120[117] = "4.5681983751743456413033268196376305093509590040595182930261094908859252761697530924655649930852283295534503341542929581967081012867692190108698698006237799801339418962091877730207560007839789937153876806052229193448161273005984514504886230869730232561E-94";
1889 coeffs_120[118] = "-1.5943139155457706045530478744891549581317663177038648406493256399589001327414318955746453934207742828511041930090849236963271943244329753764497401819704943705370596846318480510254313447057477914171472190541408193443142906466279172123681623644325254209E-95";
1890 coeffs_120[119] = "2.7319125666863032595604997603472305262880292377469053594326527505796348018540179196191192420176181194669607935656210005192217186286873953583571180312679155204061051208771126804209623533044988888808754656646355388901404252058383561064953226611421609762E-97";
1891 coeffs[3].swap(coeffs_120);
1895 /** The Gamma function.
1896 * Use the Lanczos approximation. If the coefficients used here are not
1897 * sufficiently many or sufficiently accurate, more can be calculated
1898 * using the program doc/examples/lanczos.cpp. In that case, be sure to
1899 * read the comments in that file. */
1900 const numeric lgamma(const numeric &x)
1903 if (lc.sufficiently_accurate(Digits)) {
1904 cln::cl_N pi_val = cln::pi(cln::default_float_format);
1906 return log(pi_val) - log(sin(pi_val*x.to_cl_N()))
1907 - lgamma(numeric(1).sub(x));
1908 cln::cl_N A = lc.calc_lanczos_A(x.to_cl_N());
1909 cln::cl_N temp = x.to_cl_N() + lc.get_order() - cln::cl_N(1)/2;
1910 cln::cl_N result = log(cln::cl_I(2)*pi_val)/2
1911 + (x.to_cl_N()-cln::cl_N(1)/2)*log(temp)
1920 const numeric tgamma(const numeric &x)
1923 if (lc.sufficiently_accurate(Digits)) {
1924 cln::cl_N pi_val = cln::pi(cln::default_float_format);
1926 return pi_val/(sin(pi_val*x))/(tgamma(numeric(1).sub(x)).to_cl_N());
1927 cln::cl_N A = lc.calc_lanczos_A(x.to_cl_N());
1928 cln::cl_N temp = x.to_cl_N() + lc.get_order() - cln::cl_N(1)/2;
1930 = sqrt(cln::cl_I(2)*pi_val) * expt(temp, x.to_cl_N()-cln::cl_N(1)/2)
1939 /** The psi function (aka polygamma function).
1940 * This is only a stub! */
1941 const numeric psi(const numeric &x)
1947 /** The psi functions (aka polygamma functions).
1948 * This is only a stub! */
1949 const numeric psi(const numeric &n, const numeric &x)
1955 /** Factorial combinatorial function.
1957 * @param n integer argument >= 0
1958 * @exception range_error (argument must be integer >= 0) */
1959 const numeric factorial(const numeric &n)
1961 if (!n.is_nonneg_integer())
1962 throw std::range_error("numeric::factorial(): argument must be integer >= 0");
1963 return numeric(cln::factorial(n.to_int()));
1967 /** The double factorial combinatorial function. (Scarcely used, but still
1968 * useful in cases, like for exact results of tgamma(n+1/2) for instance.)
1970 * @param n integer argument >= -1
1971 * @return n!! == n * (n-2) * (n-4) * ... * ({1|2}) with 0!! == (-1)!! == 1
1972 * @exception range_error (argument must be integer >= -1) */
1973 const numeric doublefactorial(const numeric &n)
1975 if (n.is_equal(*_num_1_p))
1978 if (!n.is_nonneg_integer())
1979 throw std::range_error("numeric::doublefactorial(): argument must be integer >= -1");
1981 return numeric(cln::doublefactorial(n.to_int()));
1985 /** The Binomial coefficients. It computes the binomial coefficients. For
1986 * integer n and k and positive n this is the number of ways of choosing k
1987 * objects from n distinct objects. If n is negative, the formula
1988 * binomial(n,k) == (-1)^k*binomial(k-n-1,k) is used to compute the result. */
1989 const numeric binomial(const numeric &n, const numeric &k)
1991 if (n.is_integer() && k.is_integer()) {
1992 if (n.is_nonneg_integer()) {
1993 if (k.compare(n)!=1 && k.compare(*_num0_p)!=-1)
1994 return numeric(cln::binomial(n.to_int(),k.to_int()));
1998 return _num_1_p->power(k)*binomial(k-n-(*_num1_p),k);
2002 // should really be gamma(n+1)/gamma(k+1)/gamma(n-k+1) or a suitable limit
2003 throw std::range_error("numeric::binomial(): don't know how to evaluate that.");
2007 /** Bernoulli number. The nth Bernoulli number is the coefficient of x^n/n!
2008 * in the expansion of the function x/(e^x-1).
2010 * @return the nth Bernoulli number (a rational number).
2011 * @exception range_error (argument must be integer >= 0) */
2012 const numeric bernoulli(const numeric &nn)
2014 if (!nn.is_integer() || nn.is_negative())
2015 throw std::range_error("numeric::bernoulli(): argument must be integer >= 0");
2019 // The Bernoulli numbers are rational numbers that may be computed using
2022 // B_n = - 1/(n+1) * sum_{k=0}^{n-1}(binomial(n+1,k)*B_k)
2024 // with B(0) = 1. Since the n'th Bernoulli number depends on all the
2025 // previous ones, the computation is necessarily very expensive. There are
2026 // several other ways of computing them, a particularly good one being
2030 // for (unsigned i=0; i<n; i++) {
2031 // c = exquo(c*(i-n),(i+2));
2032 // Bern = Bern + c*s/(i+2);
2033 // s = s + expt_pos(cl_I(i+2),n);
2037 // But if somebody works with the n'th Bernoulli number she is likely to
2038 // also need all previous Bernoulli numbers. So we need a complete remember
2039 // table and above divide and conquer algorithm is not suited to build one
2040 // up. The formula below accomplishes this. It is a modification of the
2041 // defining formula above but the computation of the binomial coefficients
2042 // is carried along in an inline fashion. It also honors the fact that
2043 // B_n is zero when n is odd and greater than 1.
2045 // (There is an interesting relation with the tangent polynomials described
2046 // in `Concrete Mathematics', which leads to a program a little faster as
2047 // our implementation below, but it requires storing one such polynomial in
2048 // addition to the remember table. This doubles the memory footprint so
2049 // we don't use it.)
2051 const unsigned n = nn.to_int();
2053 // the special cases not covered by the algorithm below
2055 return (n==1) ? (*_num_1_2_p) : (*_num0_p);
2059 // store nonvanishing Bernoulli numbers here
2060 static std::vector< cln::cl_RA > results;
2061 static unsigned next_r = 0;
2063 // algorithm not applicable to B(2), so just store it
2065 results.push_back(cln::recip(cln::cl_RA(6)));
2069 return results[n/2-1];
2071 results.reserve(n/2);
2072 for (unsigned p=next_r; p<=n; p+=2) {
2073 cln::cl_I c = 1; // seed for binonmial coefficients
2074 cln::cl_RA b = cln::cl_RA(p-1)/-2;
2075 // The CLN manual says: "The conversion from `unsigned int' works only
2076 // if the argument is < 2^29" (This is for 32 Bit machines. More
2077 // generally, cl_value_len is the limiting exponent of 2. We must make
2078 // sure that no intermediates are created which exceed this value. The
2079 // largest intermediate is (p+3-2*k)*(p/2-k+1) <= (p^2+p)/2.
2080 if (p < (1UL<<cl_value_len/2)) {
2081 for (unsigned k=1; k<=p/2-1; ++k) {
2082 c = cln::exquo(c * ((p+3-2*k) * (p/2-k+1)), (2*k-1)*k);
2083 b = b + c*results[k-1];
2086 for (unsigned k=1; k<=p/2-1; ++k) {
2087 c = cln::exquo((c * (p+3-2*k)) * (p/2-k+1), cln::cl_I(2*k-1)*k);
2088 b = b + c*results[k-1];
2091 results.push_back(-b/(p+1));
2094 return results[n/2-1];
2098 /** Fibonacci number. The nth Fibonacci number F(n) is defined by the
2099 * recurrence formula F(n)==F(n-1)+F(n-2) with F(0)==0 and F(1)==1.
2101 * @param n an integer
2102 * @return the nth Fibonacci number F(n) (an integer number)
2103 * @exception range_error (argument must be an integer) */
2104 const numeric fibonacci(const numeric &n)
2106 if (!n.is_integer())
2107 throw std::range_error("numeric::fibonacci(): argument must be integer");
2110 // The following addition formula holds:
2112 // F(n+m) = F(m-1)*F(n) + F(m)*F(n+1) for m >= 1, n >= 0.
2114 // (Proof: For fixed m, the LHS and the RHS satisfy the same recurrence
2115 // w.r.t. n, and the initial values (n=0, n=1) agree. Hence all values
2117 // Replace m by m+1:
2118 // F(n+m+1) = F(m)*F(n) + F(m+1)*F(n+1) for m >= 0, n >= 0
2119 // Now put in m = n, to get
2120 // F(2n) = (F(n+1)-F(n))*F(n) + F(n)*F(n+1) = F(n)*(2*F(n+1) - F(n))
2121 // F(2n+1) = F(n)^2 + F(n+1)^2
2123 // F(2n+2) = F(n+1)*(2*F(n) + F(n+1))
2126 if (n.is_negative())
2128 return -fibonacci(-n);
2130 return fibonacci(-n);
2134 cln::cl_I m = cln::the<cln::cl_I>(n.to_cl_N()) >> 1L; // floor(n/2);
2135 for (uintL bit=cln::integer_length(m); bit>0; --bit) {
2136 // Since a squaring is cheaper than a multiplication, better use
2137 // three squarings instead of one multiplication and two squarings.
2138 cln::cl_I u2 = cln::square(u);
2139 cln::cl_I v2 = cln::square(v);
2140 if (cln::logbitp(bit-1, m)) {
2141 v = cln::square(u + v) - u2;
2144 u = v2 - cln::square(v - u);
2149 // Here we don't use the squaring formula because one multiplication
2150 // is cheaper than two squarings.
2151 return u * ((v << 1) - u);
2153 return cln::square(u) + cln::square(v);
2157 /** Absolute value. */
2158 const numeric abs(const numeric& x)
2160 return cln::abs(x.to_cl_N());
2164 /** Modulus (in positive representation).
2165 * In general, mod(a,b) has the sign of b or is zero, and rem(a,b) has the
2166 * sign of a or is zero. This is different from Maple's modp, where the sign
2167 * of b is ignored. It is in agreement with Mathematica's Mod.
2169 * @return a mod b in the range [0,abs(b)-1] with sign of b if both are
2170 * integer, 0 otherwise. */
2171 const numeric mod(const numeric &a, const numeric &b)
2173 if (a.is_integer() && b.is_integer())
2174 return cln::mod(cln::the<cln::cl_I>(a.to_cl_N()),
2175 cln::the<cln::cl_I>(b.to_cl_N()));
2181 /** Modulus (in symmetric representation).
2182 * Equivalent to Maple's mods.
2184 * @return a mod b in the range [-iquo(abs(b)-1,2), iquo(abs(b),2)]. */
2185 const numeric smod(const numeric &a, const numeric &b)
2187 if (a.is_integer() && b.is_integer()) {
2188 const cln::cl_I b2 = cln::ceiling1(cln::the<cln::cl_I>(b.to_cl_N()) >> 1) - 1;
2189 return cln::mod(cln::the<cln::cl_I>(a.to_cl_N()) + b2,
2190 cln::the<cln::cl_I>(b.to_cl_N())) - b2;
2196 /** Numeric integer remainder.
2197 * Equivalent to Maple's irem(a,b) as far as sign conventions are concerned.
2198 * In general, mod(a,b) has the sign of b or is zero, and irem(a,b) has the
2199 * sign of a or is zero.
2201 * @return remainder of a/b if both are integer, 0 otherwise.
2202 * @exception overflow_error (division by zero) if b is zero. */
2203 const numeric irem(const numeric &a, const numeric &b)
2206 throw std::overflow_error("numeric::irem(): division by zero");
2207 if (a.is_integer() && b.is_integer())
2208 return cln::rem(cln::the<cln::cl_I>(a.to_cl_N()),
2209 cln::the<cln::cl_I>(b.to_cl_N()));
2215 /** Numeric integer remainder.
2216 * Equivalent to Maple's irem(a,b,'q') it obeyes the relation
2217 * irem(a,b,q) == a - q*b. In general, mod(a,b) has the sign of b or is zero,
2218 * and irem(a,b) has the sign of a or is zero.
2220 * @return remainder of a/b and quotient stored in q if both are integer,
2222 * @exception overflow_error (division by zero) if b is zero. */
2223 const numeric irem(const numeric &a, const numeric &b, numeric &q)
2226 throw std::overflow_error("numeric::irem(): division by zero");
2227 if (a.is_integer() && b.is_integer()) {
2228 const cln::cl_I_div_t rem_quo = cln::truncate2(cln::the<cln::cl_I>(a.to_cl_N()),
2229 cln::the<cln::cl_I>(b.to_cl_N()));
2230 q = rem_quo.quotient;
2231 return rem_quo.remainder;
2239 /** Numeric integer quotient.
2240 * Equivalent to Maple's iquo as far as sign conventions are concerned.
2242 * @return truncated quotient of a/b if both are integer, 0 otherwise.
2243 * @exception overflow_error (division by zero) if b is zero. */
2244 const numeric iquo(const numeric &a, const numeric &b)
2247 throw std::overflow_error("numeric::iquo(): division by zero");
2248 if (a.is_integer() && b.is_integer())
2249 return cln::truncate1(cln::the<cln::cl_I>(a.to_cl_N()),
2250 cln::the<cln::cl_I>(b.to_cl_N()));
2256 /** Numeric integer quotient.
2257 * Equivalent to Maple's iquo(a,b,'r') it obeyes the relation
2258 * r == a - iquo(a,b,r)*b.
2260 * @return truncated quotient of a/b and remainder stored in r if both are
2261 * integer, 0 otherwise.
2262 * @exception overflow_error (division by zero) if b is zero. */
2263 const numeric iquo(const numeric &a, const numeric &b, numeric &r)
2266 throw std::overflow_error("numeric::iquo(): division by zero");
2267 if (a.is_integer() && b.is_integer()) {
2268 const cln::cl_I_div_t rem_quo = cln::truncate2(cln::the<cln::cl_I>(a.to_cl_N()),
2269 cln::the<cln::cl_I>(b.to_cl_N()));
2270 r = rem_quo.remainder;
2271 return rem_quo.quotient;
2279 /** Greatest Common Divisor.
2281 * @return The GCD of two numbers if both are integer, a numerical 1
2282 * if they are not. */
2283 const numeric gcd(const numeric &a, const numeric &b)
2285 if (a.is_integer() && b.is_integer())
2286 return cln::gcd(cln::the<cln::cl_I>(a.to_cl_N()),
2287 cln::the<cln::cl_I>(b.to_cl_N()));
2293 /** Least Common Multiple.
2295 * @return The LCM of two numbers if both are integer, the product of those
2296 * two numbers if they are not. */
2297 const numeric lcm(const numeric &a, const numeric &b)
2299 if (a.is_integer() && b.is_integer())
2300 return cln::lcm(cln::the<cln::cl_I>(a.to_cl_N()),
2301 cln::the<cln::cl_I>(b.to_cl_N()));
2307 /** Numeric square root.
2308 * If possible, sqrt(x) should respect squares of exact numbers, i.e. sqrt(4)
2309 * should return integer 2.
2311 * @param x numeric argument
2312 * @return square root of x. Branch cut along negative real axis, the negative
2313 * real axis itself where imag(x)==0 and real(x)<0 belongs to the upper part
2314 * where imag(x)>0. */
2315 const numeric sqrt(const numeric &x)
2317 return cln::sqrt(x.to_cl_N());
2321 /** Integer numeric square root. */
2322 const numeric isqrt(const numeric &x)
2324 if (x.is_integer()) {
2326 cln::isqrt(cln::the<cln::cl_I>(x.to_cl_N()), &root);
2333 /** Floating point evaluation of Archimedes' constant Pi. */
2336 return numeric(cln::pi(cln::default_float_format));
2340 /** Floating point evaluation of Euler's constant gamma. */
2343 return numeric(cln::eulerconst(cln::default_float_format));
2347 /** Floating point evaluation of Catalan's constant. */
2350 return numeric(cln::catalanconst(cln::default_float_format));
2354 /** _numeric_digits default ctor, checking for singleton invariance. */
2355 _numeric_digits::_numeric_digits()
2358 // It initializes to 17 digits, because in CLN float_format(17) turns out
2359 // to be 61 (<64) while float_format(18)=65. The reason is we want to
2360 // have a cl_LF instead of cl_SF, cl_FF or cl_DF.
2362 throw(std::runtime_error("I told you not to do instantiate me!"));
2364 cln::default_float_format = cln::float_format(17);
2366 // add callbacks for built-in functions
2367 // like ... add_callback(Li_lookuptable);
2371 /** Assign a native long to global Digits object. */
2372 _numeric_digits& _numeric_digits::operator=(long prec)
2374 long digitsdiff = prec - digits;
2376 cln::default_float_format = cln::float_format(prec);
2378 // call registered callbacks
2379 std::vector<digits_changed_callback>::const_iterator it = callbacklist.begin(), end = callbacklist.end();
2380 for (; it != end; ++it) {
2388 /** Convert global Digits object to native type long. */
2389 _numeric_digits::operator long()
2391 // BTW, this is approx. unsigned(cln::default_float_format*0.301)-1
2392 return (long)digits;
2396 /** Append global Digits object to ostream. */
2397 void _numeric_digits::print(std::ostream &os) const
2403 /** Add a new callback function. */
2404 void _numeric_digits::add_callback(digits_changed_callback callback)
2406 callbacklist.push_back(callback);
2410 std::ostream& operator<<(std::ostream &os, const _numeric_digits &e)
2417 // static member variables
2422 bool _numeric_digits::too_late = false;
2425 /** Accuracy in decimal digits. Only object of this type! Can be set using
2426 * assignment from C++ unsigned ints and evaluated like any built-in type. */
2427 _numeric_digits Digits;
2429 } // namespace GiNaC