* computation, square-free factorization and rational function normalization. */
/*
- * GiNaC Copyright (C) 1999-2000 Johannes Gutenberg University Mainz, Germany
+ * GiNaC Copyright (C) 1999-2002 Johannes Gutenberg University Mainz, Germany
*
* This program is free software; you can redistribute it and/or modify
* it under the terms of the GNU General Public License as published by
* Foundation, Inc., 59 Temple Place, Suite 330, Boston, MA 02111-1307 USA
*/
-#include <stdexcept>
#include <algorithm>
#include <map>
#include "constant.h"
#include "expairseq.h"
#include "fail.h"
-#include "indexed.h"
#include "inifcns.h"
#include "lst.h"
#include "mul.h"
-#include "ncmul.h"
#include "numeric.h"
#include "power.h"
#include "relational.h"
+#include "matrix.h"
#include "pseries.h"
#include "symbol.h"
#include "utils.h"
-#ifndef NO_NAMESPACE_GINAC
namespace GiNaC {
-#endif // ndef NO_NAMESPACE_GINAC
// If comparing expressions (ex::compare()) is fast, you can set this to 1.
// Some routines like quo(), rem() and gcd() will then return a quick answer
static struct _stat_print {
_stat_print() {}
~_stat_print() {
- cout << "gcd() called " << gcd_called << " times\n";
- cout << "sr_gcd() called " << sr_gcd_called << " times\n";
- cout << "heur_gcd() called " << heur_gcd_called << " times\n";
- cout << "heur_gcd() failed " << heur_gcd_failed << " times\n";
+ std::cout << "gcd() called " << gcd_called << " times\n";
+ std::cout << "sr_gcd() called " << sr_gcd_called << " times\n";
+ std::cout << "heur_gcd() called " << heur_gcd_called << " times\n";
+ std::cout << "heur_gcd() failed " << heur_gcd_failed << " times\n";
}
} stat_print;
#endif
static bool get_first_symbol(const ex &e, const symbol *&x)
{
if (is_ex_exactly_of_type(e, symbol)) {
- x = static_cast<symbol *>(e.bp);
+ x = &ex_to<symbol>(e);
return true;
} else if (is_ex_exactly_of_type(e, add) || is_ex_exactly_of_type(e, mul)) {
for (unsigned i=0; i<e.nops(); i++)
/** Maximum of deg_a and deg_b (Used for sorting) */
int max_deg;
+ /** Maximum number of terms of leading coefficient of symbol in both polynomials */
+ int max_lcnops;
+
/** Commparison operator for sorting */
- bool operator<(const sym_desc &x) const {return max_deg < x.max_deg;}
+ bool operator<(const sym_desc &x) const
+ {
+ if (max_deg == x.max_deg)
+ return max_lcnops < x.max_lcnops;
+ else
+ return max_deg < x.max_deg;
+ }
};
// Vector of sym_desc structures
// Add symbol the sym_desc_vec (used internally by get_symbol_stats())
static void add_symbol(const symbol *s, sym_desc_vec &v)
{
- sym_desc_vec::iterator it = v.begin(), itend = v.end();
+ sym_desc_vec::const_iterator it = v.begin(), itend = v.end();
while (it != itend) {
if (it->sym->compare(*s) == 0) // If it's already in there, don't add it a second time
return;
- it++;
+ ++it;
}
sym_desc d;
d.sym = s;
static void collect_symbols(const ex &e, sym_desc_vec &v)
{
if (is_ex_exactly_of_type(e, symbol)) {
- add_symbol(static_cast<symbol *>(e.bp), v);
+ add_symbol(&ex_to<symbol>(e), v);
} else if (is_ex_exactly_of_type(e, add) || is_ex_exactly_of_type(e, mul)) {
for (unsigned i=0; i<e.nops(); i++)
collect_symbols(e.op(i), v);
int deg_b = b.degree(*(it->sym));
it->deg_a = deg_a;
it->deg_b = deg_b;
- it->max_deg = max(deg_a, deg_b);
+ it->max_deg = std::max(deg_a, deg_b);
+ it->max_lcnops = std::max(a.lcoeff(*(it->sym)).nops(), b.lcoeff(*(it->sym)).nops());
it->ldeg_a = a.ldegree(*(it->sym));
it->ldeg_b = b.ldegree(*(it->sym));
- it++;
+ ++it;
}
- sort(v.begin(), v.end());
+ std::sort(v.begin(), v.end());
#if 0
std::clog << "Symbols:\n";
it = v.begin(); itend = v.end();
while (it != itend) {
- std::clog << " " << *it->sym << ": deg_a=" << it->deg_a << ", deg_b=" << it->deg_b << ", ldeg_a=" << it->ldeg_a << ", ldeg_b=" << it->ldeg_b << ", max_deg=" << it->max_deg << endl;
+ std::clog << " " << *it->sym << ": deg_a=" << it->deg_a << ", deg_b=" << it->deg_b << ", ldeg_a=" << it->ldeg_a << ", ldeg_b=" << it->ldeg_b << ", max_deg=" << it->max_deg << ", max_lcnops=" << it->max_lcnops << endl;
std::clog << " lcoeff_a=" << a.lcoeff(*(it->sym)) << ", lcoeff_b=" << b.lcoeff(*(it->sym)) << endl;
- it++;
+ ++it;
}
#endif
}
static numeric lcmcoeff(const ex &e, const numeric &l)
{
if (e.info(info_flags::rational))
- return lcm(ex_to_numeric(e).denom(), l);
+ return lcm(ex_to<numeric>(e).denom(), l);
else if (is_ex_exactly_of_type(e, add)) {
- numeric c = _num1();
+ numeric c = _num1;
for (unsigned i=0; i<e.nops(); i++)
c = lcmcoeff(e.op(i), c);
return lcm(c, l);
} else if (is_ex_exactly_of_type(e, mul)) {
- numeric c = _num1();
+ numeric c = _num1;
for (unsigned i=0; i<e.nops(); i++)
- c *= lcmcoeff(e.op(i), _num1());
+ c *= lcmcoeff(e.op(i), _num1);
return lcm(c, l);
- } else if (is_ex_exactly_of_type(e, power))
- return pow(lcmcoeff(e.op(0), l), ex_to_numeric(e.op(1)));
+ } else if (is_ex_exactly_of_type(e, power)) {
+ if (is_ex_exactly_of_type(e.op(0), symbol))
+ return l;
+ else
+ return pow(lcmcoeff(e.op(0), l), ex_to<numeric>(e.op(1)));
+ }
return l;
}
* @return LCM of denominators of coefficients */
static numeric lcm_of_coefficients_denominators(const ex &e)
{
- return lcmcoeff(e, _num1());
+ return lcmcoeff(e, _num1);
}
/** Bring polynomial from Q[X] to Z[X] by multiplying in the previously
static ex multiply_lcm(const ex &e, const numeric &lcm)
{
if (is_ex_exactly_of_type(e, mul)) {
- ex c = _ex1();
- numeric lcm_accum = _num1();
+ unsigned num = e.nops();
+ exvector v; v.reserve(num + 1);
+ numeric lcm_accum = _num1;
for (unsigned i=0; i<e.nops(); i++) {
- numeric op_lcm = lcmcoeff(e.op(i), _num1());
- c *= multiply_lcm(e.op(i), op_lcm);
+ numeric op_lcm = lcmcoeff(e.op(i), _num1);
+ v.push_back(multiply_lcm(e.op(i), op_lcm));
lcm_accum *= op_lcm;
}
- c *= lcm / lcm_accum;
- return c;
+ v.push_back(lcm / lcm_accum);
+ return (new mul(v))->setflag(status_flags::dynallocated);
} else if (is_ex_exactly_of_type(e, add)) {
- ex c = _ex0();
- for (unsigned i=0; i<e.nops(); i++)
- c += multiply_lcm(e.op(i), lcm);
- return c;
+ unsigned num = e.nops();
+ exvector v; v.reserve(num);
+ for (unsigned i=0; i<num; i++)
+ v.push_back(multiply_lcm(e.op(i), lcm));
+ return (new add(v))->setflag(status_flags::dynallocated);
} else if (is_ex_exactly_of_type(e, power)) {
- return pow(multiply_lcm(e.op(0), lcm.power(ex_to_numeric(e.op(1)).inverse())), e.op(1));
+ if (is_ex_exactly_of_type(e.op(0), symbol))
+ return e * lcm;
+ else
+ return pow(multiply_lcm(e.op(0), lcm.power(ex_to<numeric>(e.op(1)).inverse())), e.op(1));
} else
return e * lcm;
}
numeric basic::integer_content(void) const
{
- return _num1();
+ return _num1;
}
numeric numeric::integer_content(void) const
{
epvector::const_iterator it = seq.begin();
epvector::const_iterator itend = seq.end();
- numeric c = _num0();
+ numeric c = _num0;
while (it != itend) {
- GINAC_ASSERT(!is_ex_exactly_of_type(it->rest,numeric));
- GINAC_ASSERT(is_ex_exactly_of_type(it->coeff,numeric));
- c = gcd(ex_to_numeric(it->coeff), c);
+ GINAC_ASSERT(!is_exactly_a<numeric>(it->rest));
+ GINAC_ASSERT(is_exactly_a<numeric>(it->coeff));
+ c = gcd(ex_to<numeric>(it->coeff), c);
it++;
}
- GINAC_ASSERT(is_ex_exactly_of_type(overall_coeff,numeric));
- c = gcd(ex_to_numeric(overall_coeff),c);
+ GINAC_ASSERT(is_exactly_a<numeric>(overall_coeff));
+ c = gcd(ex_to<numeric>(overall_coeff),c);
return c;
}
epvector::const_iterator it = seq.begin();
epvector::const_iterator itend = seq.end();
while (it != itend) {
- GINAC_ASSERT(!is_ex_exactly_of_type(recombine_pair_to_ex(*it),numeric));
+ GINAC_ASSERT(!is_exactly_a<numeric>(recombine_pair_to_ex(*it)));
++it;
}
#endif // def DO_GINAC_ASSERT
- GINAC_ASSERT(is_ex_exactly_of_type(overall_coeff,numeric));
- return abs(ex_to_numeric(overall_coeff));
+ GINAC_ASSERT(is_exactly_a<numeric>(overall_coeff));
+ return abs(ex_to<numeric>(overall_coeff));
}
return a / b;
#if FAST_COMPARE
if (a.is_equal(b))
- return _ex1();
+ return _ex1;
#endif
if (check_args && (!a.info(info_flags::rational_polynomial) || !b.info(info_flags::rational_polynomial)))
throw(std::invalid_argument("quo: arguments must be polynomials over the rationals"));
// Polynomial long division
- ex q = _ex0();
ex r = a.expand();
if (r.is_zero())
return r;
int rdeg = r.degree(x);
ex blcoeff = b.expand().coeff(x, bdeg);
bool blcoeff_is_numeric = is_ex_exactly_of_type(blcoeff, numeric);
+ exvector v; v.reserve(std::max(rdeg - bdeg + 1, 0));
while (rdeg >= bdeg) {
ex term, rcoeff = r.coeff(x, rdeg);
if (blcoeff_is_numeric)
term = rcoeff / blcoeff;
else {
if (!divide(rcoeff, blcoeff, term, false))
- return *new ex(fail());
+ return (new fail())->setflag(status_flags::dynallocated);
}
term *= power(x, rdeg - bdeg);
- q += term;
+ v.push_back(term);
r -= (term * b).expand();
if (r.is_zero())
break;
rdeg = r.degree(x);
}
- return q;
+ return (new add(v))->setflag(status_flags::dynallocated);
}
throw(std::overflow_error("rem: division by zero"));
if (is_ex_exactly_of_type(a, numeric)) {
if (is_ex_exactly_of_type(b, numeric))
- return _ex0();
+ return _ex0;
else
- return b;
+ return a;
}
#if FAST_COMPARE
if (a.is_equal(b))
- return _ex0();
+ return _ex0;
#endif
if (check_args && (!a.info(info_flags::rational_polynomial) || !b.info(info_flags::rational_polynomial)))
throw(std::invalid_argument("rem: arguments must be polynomials over the rationals"));
term = rcoeff / blcoeff;
else {
if (!divide(rcoeff, blcoeff, term, false))
- return *new ex(fail());
+ return (new fail())->setflag(status_flags::dynallocated);
}
term *= power(x, rdeg - bdeg);
r -= (term * b).expand();
}
-/** Pseudo-remainder of polynomials a(x) and b(x) in Z[x].
+/** Decompose rational function a(x)=N(x)/D(x) into P(x)+n(x)/D(x)
+ * with degree(n, x) < degree(D, x).
+ *
+ * @param a rational function in x
+ * @param x a is a function of x
+ * @return decomposed function. */
+ex decomp_rational(const ex &a, const symbol &x)
+{
+ ex nd = numer_denom(a);
+ ex numer = nd.op(0), denom = nd.op(1);
+ ex q = quo(numer, denom, x);
+ if (is_ex_exactly_of_type(q, fail))
+ return a;
+ else
+ return q + rem(numer, denom, x) / denom;
+}
+
+
+/** Pseudo-remainder of polynomials a(x) and b(x) in Q[x].
*
* @param a first polynomial in x (dividend)
* @param b second polynomial in x (divisor)
* @param x a and b are polynomials in x
* @param check_args check whether a and b are polynomials with rational
* coefficients (defaults to "true")
- * @return pseudo-remainder of a(x) and b(x) in Z[x] */
+ * @return pseudo-remainder of a(x) and b(x) in Q[x] */
ex prem(const ex &a, const ex &b, const symbol &x, bool check_args)
{
if (b.is_zero())
throw(std::overflow_error("prem: division by zero"));
if (is_ex_exactly_of_type(a, numeric)) {
if (is_ex_exactly_of_type(b, numeric))
- return _ex0();
+ return _ex0;
else
return b;
}
if (bdeg <= rdeg) {
blcoeff = eb.coeff(x, bdeg);
if (bdeg == 0)
- eb = _ex0();
+ eb = _ex0;
else
eb -= blcoeff * power(x, bdeg);
} else
- blcoeff = _ex1();
+ blcoeff = _ex1;
int delta = rdeg - bdeg + 1, i = 0;
while (rdeg >= bdeg && !r.is_zero()) {
ex rlcoeff = r.coeff(x, rdeg);
ex term = (power(x, rdeg - bdeg) * eb * rlcoeff).expand();
if (rdeg == 0)
- r = _ex0();
+ r = _ex0;
else
r -= rlcoeff * power(x, rdeg);
r = (blcoeff * r).expand() - term;
}
-/** Sparse pseudo-remainder of polynomials a(x) and b(x) in Z[x].
+/** Sparse pseudo-remainder of polynomials a(x) and b(x) in Q[x].
*
* @param a first polynomial in x (dividend)
* @param b second polynomial in x (divisor)
* @param x a and b are polynomials in x
* @param check_args check whether a and b are polynomials with rational
* coefficients (defaults to "true")
- * @return sparse pseudo-remainder of a(x) and b(x) in Z[x] */
-
+ * @return sparse pseudo-remainder of a(x) and b(x) in Q[x] */
ex sprem(const ex &a, const ex &b, const symbol &x, bool check_args)
{
if (b.is_zero())
throw(std::overflow_error("prem: division by zero"));
if (is_ex_exactly_of_type(a, numeric)) {
if (is_ex_exactly_of_type(b, numeric))
- return _ex0();
+ return _ex0;
else
return b;
}
if (bdeg <= rdeg) {
blcoeff = eb.coeff(x, bdeg);
if (bdeg == 0)
- eb = _ex0();
+ eb = _ex0;
else
eb -= blcoeff * power(x, bdeg);
} else
- blcoeff = _ex1();
+ blcoeff = _ex1;
while (rdeg >= bdeg && !r.is_zero()) {
ex rlcoeff = r.coeff(x, rdeg);
ex term = (power(x, rdeg - bdeg) * eb * rlcoeff).expand();
if (rdeg == 0)
- r = _ex0();
+ r = _ex0;
else
r -= rlcoeff * power(x, rdeg);
r = (blcoeff * r).expand() - term;
* @param check_args check whether a and b are polynomials with rational
* coefficients (defaults to "true")
* @return "true" when exact division succeeds (quotient returned in q),
- * "false" otherwise */
+ * "false" otherwise (q left untouched) */
bool divide(const ex &a, const ex &b, ex &q, bool check_args)
{
- q = _ex0();
if (b.is_zero())
throw(std::overflow_error("divide: division by zero"));
- if (a.is_zero())
+ if (a.is_zero()) {
+ q = _ex0;
return true;
+ }
if (is_ex_exactly_of_type(b, numeric)) {
q = a / b;
return true;
return false;
#if FAST_COMPARE
if (a.is_equal(b)) {
- q = _ex1();
+ q = _ex1;
return true;
}
#endif
if (check_args && (!a.info(info_flags::rational_polynomial) ||
- !b.info(info_flags::rational_polynomial)))
+ !b.info(info_flags::rational_polynomial)))
throw(std::invalid_argument("divide: arguments must be polynomials over the rationals"));
// Find first symbol
// Polynomial long division (recursive)
ex r = a.expand();
- if (r.is_zero())
+ if (r.is_zero()) {
+ q = _ex0;
return true;
+ }
int bdeg = b.degree(*x);
int rdeg = r.degree(*x);
ex blcoeff = b.expand().coeff(*x, bdeg);
bool blcoeff_is_numeric = is_ex_exactly_of_type(blcoeff, numeric);
+ exvector v; v.reserve(std::max(rdeg - bdeg + 1, 0));
while (rdeg >= bdeg) {
ex term, rcoeff = r.coeff(*x, rdeg);
if (blcoeff_is_numeric)
if (!divide(rcoeff, blcoeff, term, false))
return false;
term *= power(*x, rdeg - bdeg);
- q += term;
+ v.push_back(term);
r -= (term * b).expand();
- if (r.is_zero())
+ if (r.is_zero()) {
+ q = (new add(v))->setflag(status_flags::dynallocated);
return true;
+ }
rdeg = r.degree(*x);
}
return false;
typedef std::pair<ex, bool> exbool;
struct ex2_less {
- bool operator() (const ex2 p, const ex2 q) const
+ bool operator() (const ex2 &p, const ex2 &q) const
{
- return p.first.compare(q.first) < 0 || (!(q.first.compare(p.first) < 0) && p.second.compare(q.second) < 0);
+ int cmp = p.first.compare(q.first);
+ return ((cmp<0) || (!(cmp>0) && p.second.compare(q.second)<0));
}
};
* @see get_symbol_stats, heur_gcd */
static bool divide_in_z(const ex &a, const ex &b, ex &q, sym_desc_vec::const_iterator var)
{
- q = _ex0();
+ q = _ex0;
if (b.is_zero())
throw(std::overflow_error("divide_in_z: division by zero"));
- if (b.is_equal(_ex1())) {
+ if (b.is_equal(_ex1)) {
q = a;
return true;
}
}
#if FAST_COMPARE
if (a.is_equal(b)) {
- q = _ex1();
+ q = _ex1;
return true;
}
#endif
// Compute values at evaluation points 0..adeg
vector<numeric> alpha; alpha.reserve(adeg + 1);
exvector u; u.reserve(adeg + 1);
- numeric point = _num0();
+ numeric point = _num0;
ex c;
for (i=0; i<=adeg; i++) {
ex bs = b.subs(*x == point);
while (bs.is_zero()) {
- point += _num1();
+ point += _num1;
bs = b.subs(*x == point);
}
if (!divide_in_z(a.subs(*x == point), bs, c, var+1))
return false;
alpha.push_back(point);
u.push_back(c);
- point += _num1();
+ point += _num1;
}
// Compute inverses
vector<numeric> rcp; rcp.reserve(adeg + 1);
- rcp.push_back(_num0());
+ rcp.push_back(_num0);
for (k=1; k<=adeg; k++) {
numeric product = alpha[k] - alpha[0];
for (i=1; i<k; i++)
int rdeg = adeg;
ex eb = b.expand();
ex blcoeff = eb.coeff(*x, bdeg);
+ exvector v; v.reserve(std::max(rdeg - bdeg + 1, 0));
while (rdeg >= bdeg) {
ex term, rcoeff = r.coeff(*x, rdeg);
if (!divide_in_z(rcoeff, blcoeff, term, var+1))
break;
term = (term * power(*x, rdeg - bdeg)).expand();
- q += term;
+ v.push_back(term);
r -= (term * eb).expand();
if (r.is_zero()) {
+ q = (new add(v))->setflag(status_flags::dynallocated);
#if USE_REMEMBER
dr_remember[ex2(a, b)] = exbool(q, true);
#endif
{
ex c = expand().lcoeff(x);
if (is_ex_exactly_of_type(c, numeric))
- return c < _ex0() ? _ex_1() : _ex1();
+ return c < _ex0 ? _ex_1 : _ex1;
else {
const symbol *y;
if (get_first_symbol(c, y))
ex ex::content(const symbol &x) const
{
if (is_zero())
- return _ex0();
+ return _ex0;
if (is_ex_exactly_of_type(*this, numeric))
return info(info_flags::negative) ? -*this : *this;
ex e = expand();
if (e.is_zero())
- return _ex0();
+ return _ex0;
// First, try the integer content
ex c = e.integer_content();
int ldeg = e.ldegree(x);
if (deg == ldeg)
return e.lcoeff(x) / e.unit(x);
- c = _ex0();
+ c = _ex0;
for (int i=ldeg; i<=deg; i++)
c = gcd(e.coeff(x, i), c, NULL, NULL, false);
return c;
ex ex::primpart(const symbol &x) const
{
if (is_zero())
- return _ex0();
+ return _ex0;
if (is_ex_exactly_of_type(*this, numeric))
- return _ex1();
+ return _ex1;
ex c = content(x);
if (c.is_zero())
- return _ex0();
+ return _ex0;
ex u = unit(x);
if (is_ex_exactly_of_type(c, numeric))
return *this / (c * u);
ex ex::primpart(const symbol &x, const ex &c) const
{
if (is_zero())
- return _ex0();
+ return _ex0;
if (c.is_zero())
- return _ex0();
+ return _ex0;
if (is_ex_exactly_of_type(*this, numeric))
- return _ex1();
+ return _ex1;
ex u = unit(x);
if (is_ex_exactly_of_type(c, numeric))
d = d.primpart(*x, cont_d);
// First element of divisor sequence
- ex r, ri = _ex1();
+ ex r, ri = _ex1;
int delta = cdeg - ddeg;
for (;;) {
//std::clog << " content " << gamma << " removed, continuing with sr_gcd(" << c << "," << d << ")\n";
// First element of subresultant sequence
- ex r = _ex0(), ri = _ex1(), psi = _ex1();
+ ex r = _ex0, ri = _ex1, psi = _ex1;
int delta = cdeg - ddeg;
for (;;) {
return bp->max_coefficient();
}
+/** Implementation ex::max_coefficient().
+ * @see heur_gcd */
numeric basic::max_coefficient(void) const
{
- return _num1();
+ return _num1;
}
numeric numeric::max_coefficient(void) const
{
epvector::const_iterator it = seq.begin();
epvector::const_iterator itend = seq.end();
- GINAC_ASSERT(is_ex_exactly_of_type(overall_coeff,numeric));
- numeric cur_max = abs(ex_to_numeric(overall_coeff));
+ GINAC_ASSERT(is_exactly_a<numeric>(overall_coeff));
+ numeric cur_max = abs(ex_to<numeric>(overall_coeff));
while (it != itend) {
numeric a;
- GINAC_ASSERT(!is_ex_exactly_of_type(it->rest,numeric));
- a = abs(ex_to_numeric(it->coeff));
+ GINAC_ASSERT(!is_exactly_a<numeric>(it->rest));
+ a = abs(ex_to<numeric>(it->coeff));
if (a > cur_max)
cur_max = a;
it++;
epvector::const_iterator it = seq.begin();
epvector::const_iterator itend = seq.end();
while (it != itend) {
- GINAC_ASSERT(!is_ex_exactly_of_type(recombine_pair_to_ex(*it),numeric));
+ GINAC_ASSERT(!is_exactly_a<numeric>(recombine_pair_to_ex(*it)));
it++;
}
#endif // def DO_GINAC_ASSERT
- GINAC_ASSERT(is_ex_exactly_of_type(overall_coeff,numeric));
- return abs(ex_to_numeric(overall_coeff));
+ GINAC_ASSERT(is_exactly_a<numeric>(overall_coeff));
+ return abs(ex_to<numeric>(overall_coeff));
}
-/** Apply symmetric modular homomorphism to a multivariate polynomial.
- * This function is used internally by heur_gcd().
+/** Apply symmetric modular homomorphism to an expanded multivariate
+ * polynomial. This function is usually used internally by heur_gcd().
*
- * @param e expanded multivariate polynomial
* @param xi modulus
* @return mapped polynomial
* @see heur_gcd */
-ex ex::smod(const numeric &xi) const
-{
- GINAC_ASSERT(bp!=0);
- return bp->smod(xi);
-}
-
ex basic::smod(const numeric &xi) const
{
return *this;
ex numeric::smod(const numeric &xi) const
{
-#ifndef NO_NAMESPACE_GINAC
return GiNaC::smod(*this, xi);
-#else // ndef NO_NAMESPACE_GINAC
- return ::smod(*this, xi);
-#endif // ndef NO_NAMESPACE_GINAC
}
ex add::smod(const numeric &xi) const
epvector::const_iterator it = seq.begin();
epvector::const_iterator itend = seq.end();
while (it != itend) {
- GINAC_ASSERT(!is_ex_exactly_of_type(it->rest,numeric));
-#ifndef NO_NAMESPACE_GINAC
- numeric coeff = GiNaC::smod(ex_to_numeric(it->coeff), xi);
-#else // ndef NO_NAMESPACE_GINAC
- numeric coeff = ::smod(ex_to_numeric(it->coeff), xi);
-#endif // ndef NO_NAMESPACE_GINAC
+ GINAC_ASSERT(!is_exactly_a<numeric>(it->rest));
+ numeric coeff = GiNaC::smod(ex_to<numeric>(it->coeff), xi);
if (!coeff.is_zero())
newseq.push_back(expair(it->rest, coeff));
it++;
}
- GINAC_ASSERT(is_ex_exactly_of_type(overall_coeff,numeric));
-#ifndef NO_NAMESPACE_GINAC
- numeric coeff = GiNaC::smod(ex_to_numeric(overall_coeff), xi);
-#else // ndef NO_NAMESPACE_GINAC
- numeric coeff = ::smod(ex_to_numeric(overall_coeff), xi);
-#endif // ndef NO_NAMESPACE_GINAC
+ GINAC_ASSERT(is_exactly_a<numeric>(overall_coeff));
+ numeric coeff = GiNaC::smod(ex_to<numeric>(overall_coeff), xi);
return (new add(newseq,coeff))->setflag(status_flags::dynallocated);
}
epvector::const_iterator it = seq.begin();
epvector::const_iterator itend = seq.end();
while (it != itend) {
- GINAC_ASSERT(!is_ex_exactly_of_type(recombine_pair_to_ex(*it),numeric));
+ GINAC_ASSERT(!is_exactly_a<numeric>(recombine_pair_to_ex(*it)));
it++;
}
#endif // def DO_GINAC_ASSERT
- mul * mulcopyp=new mul(*this);
- GINAC_ASSERT(is_ex_exactly_of_type(overall_coeff,numeric));
-#ifndef NO_NAMESPACE_GINAC
- mulcopyp->overall_coeff = GiNaC::smod(ex_to_numeric(overall_coeff),xi);
-#else // ndef NO_NAMESPACE_GINAC
- mulcopyp->overall_coeff = ::smod(ex_to_numeric(overall_coeff),xi);
-#endif // ndef NO_NAMESPACE_GINAC
+ mul * mulcopyp = new mul(*this);
+ GINAC_ASSERT(is_exactly_a<numeric>(overall_coeff));
+ mulcopyp->overall_coeff = GiNaC::smod(ex_to<numeric>(overall_coeff),xi);
mulcopyp->clearflag(status_flags::evaluated);
mulcopyp->clearflag(status_flags::hash_calculated);
return mulcopyp->setflag(status_flags::dynallocated);
/** xi-adic polynomial interpolation */
-static ex interpolate(const ex &gamma, const numeric &xi, const symbol &x)
+static ex interpolate(const ex &gamma, const numeric &xi, const symbol &x, int degree_hint = 1)
{
- ex g = _ex0();
+ exvector g; g.reserve(degree_hint);
ex e = gamma;
numeric rxi = xi.inverse();
for (int i=0; !e.is_zero(); i++) {
ex gi = e.smod(xi);
- g += gi * power(x, i);
+ g.push_back(gi * power(x, i));
e = (e - gi) * rxi;
}
- return g;
+ return (new add(g))->setflag(status_flags::dynallocated);
}
/** Exception thrown by heur_gcd() to signal failure. */
heur_gcd_called++;
#endif
- // Algorithms only works for non-vanishing input polynomials
+ // Algorithm only works for non-vanishing input polynomials
if (a.is_zero() || b.is_zero())
- return *new ex(fail());
+ return (new fail())->setflag(status_flags::dynallocated);
// GCD of two numeric values -> CLN
if (is_ex_exactly_of_type(a, numeric) && is_ex_exactly_of_type(b, numeric)) {
- numeric g = gcd(ex_to_numeric(a), ex_to_numeric(b));
+ numeric g = gcd(ex_to<numeric>(a), ex_to<numeric>(b));
if (ca)
- *ca = ex_to_numeric(a) / g;
+ *ca = ex_to<numeric>(a) / g;
if (cb)
- *cb = ex_to_numeric(b) / g;
+ *cb = ex_to<numeric>(b) / g;
return g;
}
numeric rgc = gc.inverse();
ex p = a * rgc;
ex q = b * rgc;
- int maxdeg = max(p.degree(x), q.degree(x));
-
+ int maxdeg = std::max(p.degree(x), q.degree(x));
+
// Find evaluation point
- numeric mp = p.max_coefficient(), mq = q.max_coefficient();
+ numeric mp = p.max_coefficient();
+ numeric mq = q.max_coefficient();
numeric xi;
if (mp > mq)
- xi = mq * _num2() + _num2();
+ xi = mq * _num2 + _num2;
else
- xi = mp * _num2() + _num2();
+ xi = mp * _num2 + _num2;
// 6 tries maximum
for (int t=0; t<6; t++) {
if (xi.int_length() * maxdeg > 100000) {
-//std::clog << "giving up heur_gcd, xi.int_length = " << xi.int_length() << ", maxdeg = " << maxdeg << endl;
+//std::clog << "giving up heur_gcd, xi.int_length = " << xi.int_length() << ", maxdeg = " << maxdeg << std::endl;
throw gcdheu_failed();
}
if (!is_ex_exactly_of_type(gamma, fail)) {
// Reconstruct polynomial from GCD of mapped polynomials
- ex g = interpolate(gamma, xi, x);
+ ex g = interpolate(gamma, xi, x, maxdeg);
// Remove integer content
g /= g.integer_content();
if (divide_in_z(p, g, ca ? *ca : dummy, var) && divide_in_z(q, g, cb ? *cb : dummy, var)) {
g *= gc;
ex lc = g.lcoeff(x);
- if (is_ex_exactly_of_type(lc, numeric) && ex_to_numeric(lc).is_negative())
+ if (is_ex_exactly_of_type(lc, numeric) && ex_to<numeric>(lc).is_negative())
return -g;
else
return g;
if (ca)
*ca = cp;
ex lc = g.lcoeff(x);
- if (is_ex_exactly_of_type(lc, numeric) && ex_to_numeric(lc).is_negative())
+ if (is_ex_exactly_of_type(lc, numeric) && ex_to<numeric>(lc).is_negative())
return -g;
else
return g;
if (cb)
*cb = cq;
ex lc = g.lcoeff(x);
- if (is_ex_exactly_of_type(lc, numeric) && ex_to_numeric(lc).is_negative())
+ if (is_ex_exactly_of_type(lc, numeric) && ex_to<numeric>(lc).is_negative())
return -g;
else
return g;
// Next evaluation point
xi = iquo(xi * isqrt(isqrt(xi)) * numeric(73794), numeric(27011));
}
- return *new ex(fail());
+ return (new fail())->setflag(status_flags::dynallocated);
}
// GCD of numerics -> CLN
if (is_ex_exactly_of_type(a, numeric) && is_ex_exactly_of_type(b, numeric)) {
- numeric g = gcd(ex_to_numeric(a), ex_to_numeric(b));
+ numeric g = gcd(ex_to<numeric>(a), ex_to<numeric>(b));
if (ca || cb) {
if (g.is_zero()) {
if (ca)
- *ca = _ex0();
+ *ca = _ex0;
if (cb)
- *cb = _ex0();
+ *cb = _ex0;
} else {
if (ca)
- *ca = ex_to_numeric(a) / g;
+ *ca = ex_to<numeric>(a) / g;
if (cb)
- *cb = ex_to_numeric(b) / g;
+ *cb = ex_to<numeric>(b) / g;
}
}
return g;
}
// Check arguments
- if (check_args && !a.info(info_flags::rational_polynomial) || !b.info(info_flags::rational_polynomial)) {
+ if (check_args && (!a.info(info_flags::rational_polynomial) || !b.info(info_flags::rational_polynomial))) {
throw(std::invalid_argument("gcd: arguments must be polynomials over the rationals"));
}
if (is_ex_exactly_of_type(b, mul) && b.nops() > a.nops())
goto factored_b;
factored_a:
- ex g = _ex1();
- ex acc_ca = _ex1();
+ unsigned num = a.nops();
+ exvector g; g.reserve(num);
+ exvector acc_ca; acc_ca.reserve(num);
ex part_b = b;
- for (unsigned i=0; i<a.nops(); i++) {
+ for (unsigned i=0; i<num; i++) {
ex part_ca, part_cb;
- g *= gcd(a.op(i), part_b, &part_ca, &part_cb, check_args);
- acc_ca *= part_ca;
+ g.push_back(gcd(a.op(i), part_b, &part_ca, &part_cb, check_args));
+ acc_ca.push_back(part_ca);
part_b = part_cb;
}
if (ca)
- *ca = acc_ca;
+ *ca = (new mul(acc_ca))->setflag(status_flags::dynallocated);
if (cb)
*cb = part_b;
- return g;
+ return (new mul(g))->setflag(status_flags::dynallocated);
} else if (is_ex_exactly_of_type(b, mul)) {
if (is_ex_exactly_of_type(a, mul) && a.nops() > b.nops())
goto factored_a;
factored_b:
- ex g = _ex1();
- ex acc_cb = _ex1();
+ unsigned num = b.nops();
+ exvector g; g.reserve(num);
+ exvector acc_cb; acc_cb.reserve(num);
ex part_a = a;
- for (unsigned i=0; i<b.nops(); i++) {
+ for (unsigned i=0; i<num; i++) {
ex part_ca, part_cb;
- g *= gcd(part_a, b.op(i), &part_ca, &part_cb, check_args);
- acc_cb *= part_cb;
+ g.push_back(gcd(part_a, b.op(i), &part_ca, &part_cb, check_args));
+ acc_cb.push_back(part_cb);
part_a = part_ca;
}
if (ca)
*ca = part_a;
if (cb)
- *cb = acc_cb;
- return g;
+ *cb = (new mul(acc_cb))->setflag(status_flags::dynallocated);
+ return (new mul(g))->setflag(status_flags::dynallocated);
}
#if FAST_COMPARE
ex exp_a = a.op(1), exp_b = b.op(1);
if (exp_a < exp_b) {
if (ca)
- *ca = _ex1();
+ *ca = _ex1;
if (cb)
*cb = power(p, exp_b - exp_a);
return power(p, exp_a);
if (ca)
*ca = power(p, exp_a - exp_b);
if (cb)
- *cb = _ex1();
+ *cb = _ex1;
return power(p, exp_b);
}
}
if (ca)
*ca = power(p, a.op(1) - 1);
if (cb)
- *cb = _ex1();
+ *cb = _ex1;
return p;
}
}
if (p.is_equal(a)) {
// a = p, b = p^n, gcd = p
if (ca)
- *ca = _ex1();
+ *ca = _ex1;
if (cb)
*cb = power(p, b.op(1) - 1);
return p;
ex aex = a.expand(), bex = b.expand();
if (aex.is_zero()) {
if (ca)
- *ca = _ex0();
+ *ca = _ex0;
if (cb)
- *cb = _ex1();
+ *cb = _ex1;
return b;
}
if (bex.is_zero()) {
if (ca)
- *ca = _ex1();
+ *ca = _ex1;
if (cb)
- *cb = _ex0();
+ *cb = _ex0;
return a;
}
- if (aex.is_equal(_ex1()) || bex.is_equal(_ex1())) {
+ if (aex.is_equal(_ex1) || bex.is_equal(_ex1)) {
if (ca)
*ca = a;
if (cb)
*cb = b;
- return _ex1();
+ return _ex1;
}
#if FAST_COMPARE
if (a.is_equal(b)) {
if (ca)
- *ca = _ex1();
+ *ca = _ex1;
if (cb)
- *cb = _ex1();
+ *cb = _ex1;
return a;
}
#endif
// Cancel trivial common factor
int ldeg_a = var->ldeg_a;
int ldeg_b = var->ldeg_b;
- int min_ldeg = min(ldeg_a, ldeg_b);
+ int min_ldeg = std::min(ldeg_a,ldeg_b);
if (min_ldeg > 0) {
ex common = power(x, min_ldeg);
-//std::clog << "trivial common factor " << common << endl;
+//std::clog << "trivial common factor " << common << std::endl;
return gcd((aex / common).expand(), (bex / common).expand(), ca, cb, false) * common;
}
// Try to eliminate variables
if (var->deg_a == 0) {
-//std::clog << "eliminating variable " << x << " from b" << endl;
+//std::clog << "eliminating variable " << x << " from b" << std::endl;
ex c = bex.content(x);
ex g = gcd(aex, c, ca, cb, false);
if (cb)
*cb *= bex.unit(x) * bex.primpart(x, c);
return g;
} else if (var->deg_b == 0) {
-//std::clog << "eliminating variable " << x << " from a" << endl;
+//std::clog << "eliminating variable " << x << " from a" << std::endl;
ex c = aex.content(x);
ex g = gcd(c, bex, ca, cb, false);
if (ca)
try {
g = heur_gcd(aex, bex, ca, cb, var);
} catch (gcdheu_failed) {
- g = *new ex(fail());
+ g = fail();
}
if (is_ex_exactly_of_type(g, fail)) {
-//std::clog << "heuristics failed" << endl;
+//std::clog << "heuristics failed" << std::endl;
#if STATISTICS
heur_gcd_failed++;
#endif
// g = peu_gcd(aex, bex, &x);
// g = red_gcd(aex, bex, &x);
g = sr_gcd(aex, bex, var);
- if (g.is_equal(_ex1())) {
+ if (g.is_equal(_ex1)) {
// Keep cofactors factored if possible
if (ca)
*ca = a;
}
#if 1
} else {
- if (g.is_equal(_ex1())) {
+ if (g.is_equal(_ex1)) {
// Keep cofactors factored if possible
if (ca)
*ca = a;
ex lcm(const ex &a, const ex &b, bool check_args)
{
if (is_ex_exactly_of_type(a, numeric) && is_ex_exactly_of_type(b, numeric))
- return lcm(ex_to_numeric(a), ex_to_numeric(b));
- if (check_args && !a.info(info_flags::rational_polynomial) || !b.info(info_flags::rational_polynomial))
+ return lcm(ex_to<numeric>(a), ex_to<numeric>(b));
+ if (check_args && (!a.info(info_flags::rational_polynomial) || !b.info(info_flags::rational_polynomial)))
throw(std::invalid_argument("lcm: arguments must be polynomials over the rationals"));
ex ca, cb;
* Square-free factorization
*/
-// Univariate GCD of polynomials in Q[x] (used internally by sqrfree()).
-// a and b can be multivariate polynomials but they are treated as univariate polynomials in x.
-static ex univariate_gcd(const ex &a, const ex &b, const symbol &x)
+/** Compute square-free factorization of multivariate polynomial a(x) using
+ * Yun´s algorithm. Used internally by sqrfree().
+ *
+ * @param a multivariate polynomial over Z[X], treated here as univariate
+ * polynomial in x.
+ * @param x variable to factor in
+ * @return vector of factors sorted in ascending degree */
+static exvector sqrfree_yun(const ex &a, const symbol &x)
{
- if (a.is_zero())
- return b;
- if (b.is_zero())
+ exvector res;
+ ex w = a;
+ ex z = w.diff(x);
+ ex g = gcd(w, z);
+ if (g.is_equal(_ex1)) {
+ res.push_back(a);
+ return res;
+ }
+ ex y;
+ do {
+ w = quo(w, g, x);
+ y = quo(z, g, x);
+ z = y - w.diff(x);
+ g = gcd(w, z);
+ res.push_back(g);
+ } while (!z.is_zero());
+ return res;
+}
+
+/** Compute a square-free factorization of a multivariate polynomial in Q[X].
+ *
+ * @param a multivariate polynomial over Q[X]
+ * @param x lst of variables to factor in, may be left empty for autodetection
+ * @return a square-free factorization of \p a.
+ *
+ * \note
+ * A polynomial \f$p(X) \in C[X]\f$ is said <EM>square-free</EM>
+ * if, whenever any two polynomials \f$q(X)\f$ and \f$r(X)\f$
+ * are such that
+ * \f[
+ * p(X) = q(X)^2 r(X),
+ * \f]
+ * we have \f$q(X) \in C\f$.
+ * This means that \f$p(X)\f$ has no repeated factors, apart
+ * eventually from constants.
+ * Given a polynomial \f$p(X) \in C[X]\f$, we say that the
+ * decomposition
+ * \f[
+ * p(X) = b \cdot p_1(X)^{a_1} \cdot p_2(X)^{a_2} \cdots p_r(X)^{a_r}
+ * \f]
+ * is a <EM>square-free factorization</EM> of \f$p(X)\f$ if the
+ * following conditions hold:
+ * -# \f$b \in C\f$ and \f$b \neq 0\f$;
+ * -# \f$a_i\f$ is a positive integer for \f$i = 1, \ldots, r\f$;
+ * -# the degree of the polynomial \f$p_i\f$ is strictly positive
+ * for \f$i = 1, \ldots, r\f$;
+ * -# the polynomial \f$\Pi_{i=1}^r p_i(X)\f$ is square-free.
+ *
+ * Square-free factorizations need not be unique. For example, if
+ * \f$a_i\f$ is even, we could change the polynomial \f$p_i(X)\f$
+ * into \f$-p_i(X)\f$.
+ * Observe also that the factors \f$p_i(X)\f$ need not be irreducible
+ * polynomials.
+ */
+ex sqrfree(const ex &a, const lst &l)
+{
+ if (is_a<numeric>(a) || // algorithm does not trap a==0
+ is_a<symbol>(a)) // shortcut
return a;
- if (a.is_equal(_ex1()) || b.is_equal(_ex1()))
- return _ex1();
- if (is_ex_of_type(a, numeric) && is_ex_of_type(b, numeric))
- return gcd(ex_to_numeric(a), ex_to_numeric(b));
- if (!a.info(info_flags::rational_polynomial) || !b.info(info_flags::rational_polynomial))
- throw(std::invalid_argument("univariate_gcd: arguments must be polynomials over the rationals"));
- // Euclidean algorithm
- ex c, d, r;
- if (a.degree(x) >= b.degree(x)) {
- c = a;
- d = b;
+ // If no lst of variables to factorize in was specified we have to
+ // invent one now. Maybe one can optimize here by reversing the order
+ // or so, I don't know.
+ lst args;
+ if (l.nops()==0) {
+ sym_desc_vec sdv;
+ get_symbol_stats(a, _ex0, sdv);
+ sym_desc_vec::const_iterator it = sdv.begin(), itend = sdv.end();
+ while (it != itend) {
+ args.append(*it->sym);
+ ++it;
+ }
} else {
- c = b;
- d = a;
+ args = l;
}
- for (;;) {
- r = rem(c, d, x, false);
- if (r.is_zero())
- break;
- c = d;
- d = r;
+
+ // Find the symbol to factor in at this stage
+ if (!is_ex_of_type(args.op(0), symbol))
+ throw (std::runtime_error("sqrfree(): invalid factorization variable"));
+ const symbol &x = ex_to<symbol>(args.op(0));
+
+ // convert the argument from something in Q[X] to something in Z[X]
+ const numeric lcm = lcm_of_coefficients_denominators(a);
+ const ex tmp = multiply_lcm(a,lcm);
+
+ // find the factors
+ exvector factors = sqrfree_yun(tmp,x);
+
+ // construct the next list of symbols with the first element popped
+ lst newargs = args;
+ newargs.remove_first();
+
+ // recurse down the factors in remaining variables
+ if (newargs.nops()>0) {
+ exvector::iterator i = factors.begin();
+ while (i != factors.end()) {
+ *i = sqrfree(*i, newargs);
+ ++i;
+ }
}
- return d / d.lcoeff(x);
-}
+ // Done with recursion, now construct the final result
+ ex result = _ex1;
+ exvector::const_iterator it = factors.begin(), itend = factors.end();
+ for (int p = 1; it!=itend; ++it, ++p)
+ result *= power(*it, p);
-/** Compute square-free factorization of multivariate polynomial a(x) using
- * Yun´s algorithm.
+ // Yun's algorithm does not account for constant factors. (For univariate
+ // polynomials it works only in the monic case.) We can correct this by
+ // inserting what has been lost back into the result. For completeness
+ // we'll also have to recurse down that factor in the remaining variables.
+ if (newargs.nops()>0)
+ result *= sqrfree(quo(tmp, result, x), newargs);
+ else
+ result *= quo(tmp, result, x);
+
+ // Put in the reational overall factor again and return
+ return result * lcm.inverse();
+}
+
+/** Compute square-free partial fraction decomposition of rational function
+ * a(x).
*
- * @param a multivariate polynomial
- * @param x variable to factor in
- * @return factored polynomial */
-ex sqrfree(const ex &a, const symbol &x)
+ * @param a rational function over Z[x], treated as univariate polynomial
+ * in x
+ * @param x variable to factor in
+ * @return decomposed rational function */
+ex sqrfree_parfrac(const ex & a, const symbol & x)
{
- int i = 1;
- ex res = _ex1();
- ex b = a.diff(x);
- ex c = univariate_gcd(a, b, x);
- ex w;
- if (c.is_equal(_ex1())) {
- w = a;
- } else {
- w = quo(a, c, x);
- ex y = quo(b, c, x);
- ex z = y - w.diff(x);
- while (!z.is_zero()) {
- ex g = univariate_gcd(w, z, x);
- res *= power(g, i);
- w = quo(w, g, x);
- y = quo(z, g, x);
- z = y - w.diff(x);
- i++;
+ // Find numerator and denominator
+ ex nd = numer_denom(a);
+ ex numer = nd.op(0), denom = nd.op(1);
+//clog << "numer = " << numer << ", denom = " << denom << endl;
+
+ // Convert N(x)/D(x) -> Q(x) + R(x)/D(x), so degree(R) < degree(D)
+ ex red_poly = quo(numer, denom, x), red_numer = rem(numer, denom, x).expand();
+//clog << "red_poly = " << red_poly << ", red_numer = " << red_numer << endl;
+
+ // Factorize denominator and compute cofactors
+ exvector yun = sqrfree_yun(denom, x);
+//clog << "yun factors: " << exprseq(yun) << endl;
+ unsigned num_yun = yun.size();
+ exvector factor; factor.reserve(num_yun);
+ exvector cofac; cofac.reserve(num_yun);
+ for (unsigned i=0; i<num_yun; i++) {
+ if (!yun[i].is_equal(_ex1)) {
+ for (unsigned j=0; j<=i; j++) {
+ factor.push_back(pow(yun[i], j+1));
+ ex prod = _ex1;
+ for (unsigned k=0; k<num_yun; k++) {
+ if (k == i)
+ prod *= pow(yun[k], i-j);
+ else
+ prod *= pow(yun[k], k+1);
+ }
+ cofac.push_back(prod.expand());
+ }
}
}
- return res * power(w, i);
+ unsigned num_factors = factor.size();
+//clog << "factors : " << exprseq(factor) << endl;
+//clog << "cofactors: " << exprseq(cofac) << endl;
+
+ // Construct coefficient matrix for decomposition
+ int max_denom_deg = denom.degree(x);
+ matrix sys(max_denom_deg + 1, num_factors);
+ matrix rhs(max_denom_deg + 1, 1);
+ for (int i=0; i<=max_denom_deg; i++) {
+ for (unsigned j=0; j<num_factors; j++)
+ sys(i, j) = cofac[j].coeff(x, i);
+ rhs(i, 0) = red_numer.coeff(x, i);
+ }
+//clog << "coeffs: " << sys << endl;
+//clog << "rhs : " << rhs << endl;
+
+ // Solve resulting linear system
+ matrix vars(num_factors, 1);
+ for (unsigned i=0; i<num_factors; i++)
+ vars(i, 0) = symbol();
+ matrix sol = sys.solve(vars, rhs);
+
+ // Sum up decomposed fractions
+ ex sum = 0;
+ for (unsigned i=0; i<num_factors; i++)
+ sum += sol(i, 0) / factor[i];
+
+ return red_poly + sum;
}
* the information that (a+b) is the numerator and 3 is the denominator.
*/
+
/** Create a symbol for replacing the expression "e" (or return a previously
* assigned symbol). The symbol is appended to sym_lst and returned, the
* expression is appended to repl_lst.
/** Create a symbol for replacing the expression "e" (or return a previously
* assigned symbol). An expression of the form "symbol == expression" is added
* to repl_lst and the symbol is returned.
- * @see ex::to_rational */
+ * @see basic::to_rational */
static ex replace_with_symbol(const ex &e, lst &repl_lst)
{
// Expression already in repl_lst? Then return the assigned symbol
return es;
}
-/** Default implementation of ex::normal(). It replaces the object with a
- * temporary symbol.
+
+/** Function object to be applied by basic::normal(). */
+struct normal_map_function : public map_function {
+ int level;
+ normal_map_function(int l) : level(l) {}
+ ex operator()(const ex & e) { return normal(e, level); }
+};
+
+/** Default implementation of ex::normal(). It normalizes the children and
+ * replaces the object with a temporary symbol.
* @see ex::normal */
ex basic::normal(lst &sym_lst, lst &repl_lst, int level) const
{
- return (new lst(replace_with_symbol(*this, sym_lst, repl_lst), _ex1()))->setflag(status_flags::dynallocated);
+ if (nops() == 0)
+ return (new lst(replace_with_symbol(*this, sym_lst, repl_lst), _ex1))->setflag(status_flags::dynallocated);
+ else {
+ if (level == 1)
+ return (new lst(replace_with_symbol(*this, sym_lst, repl_lst), _ex1))->setflag(status_flags::dynallocated);
+ else if (level == -max_recursion_level)
+ throw(std::runtime_error("max recursion level reached"));
+ else {
+ normal_map_function map_normal(level - 1);
+ return (new lst(replace_with_symbol(map(map_normal), sym_lst, repl_lst), _ex1))->setflag(status_flags::dynallocated);
+ }
+ }
}
* @see ex::normal */
ex symbol::normal(lst &sym_lst, lst &repl_lst, int level) const
{
- return (new lst(*this, _ex1()))->setflag(status_flags::dynallocated);
+ return (new lst(*this, _ex1))->setflag(status_flags::dynallocated);
}
{
ex num = n;
ex den = d;
- numeric pre_factor = _num1();
+ numeric pre_factor = _num1;
+
+//std::clog << "frac_cancel num = " << num << ", den = " << den << std::endl;
-//std::clog << "frac_cancel num = " << num << ", den = " << den << endl;
+ // Handle trivial case where denominator is 1
+ if (den.is_equal(_ex1))
+ return (new lst(num, den))->setflag(status_flags::dynallocated);
// Handle special cases where numerator or denominator is 0
if (num.is_zero())
- return (new lst(_ex0(), _ex1()))->setflag(status_flags::dynallocated);
+ return (new lst(num, _ex1))->setflag(status_flags::dynallocated);
if (den.expand().is_zero())
throw(std::overflow_error("frac_cancel: division by zero in frac_cancel"));
// Cancel GCD from numerator and denominator
ex cnum, cden;
- if (gcd(num, den, &cnum, &cden, false) != _ex1()) {
+ if (gcd(num, den, &cnum, &cden, false) != _ex1) {
num = cnum;
den = cden;
}
// as defined by get_first_symbol() is made positive)
const symbol *x;
if (get_first_symbol(den, x)) {
- GINAC_ASSERT(is_ex_exactly_of_type(den.unit(*x),numeric));
- if (ex_to_numeric(den.unit(*x)).is_negative()) {
- num *= _ex_1();
- den *= _ex_1();
+ GINAC_ASSERT(is_exactly_a<numeric>(den.unit(*x)));
+ if (ex_to<numeric>(den.unit(*x)).is_negative()) {
+ num *= _ex_1;
+ den *= _ex_1;
}
}
// Return result as list
-//std::clog << " returns num = " << num << ", den = " << den << ", pre_factor = " << pre_factor << endl;
+//std::clog << " returns num = " << num << ", den = " << den << ", pre_factor = " << pre_factor << std::endl;
return (new lst(num * pre_factor.numer(), den * pre_factor.denom()))->setflag(status_flags::dynallocated);
}
ex add::normal(lst &sym_lst, lst &repl_lst, int level) const
{
if (level == 1)
- return (new lst(*this, _ex1()))->setflag(status_flags::dynallocated);
+ return (new lst(replace_with_symbol(*this, sym_lst, repl_lst), _ex1))->setflag(status_flags::dynallocated);
else if (level == -max_recursion_level)
throw(std::runtime_error("max recursion level reached"));
- // Normalize and expand children, chop into summands
- exvector o;
- o.reserve(seq.size()+1);
+ // Normalize children and split each one into numerator and denominator
+ exvector nums, dens;
+ nums.reserve(seq.size()+1);
+ dens.reserve(seq.size()+1);
epvector::const_iterator it = seq.begin(), itend = seq.end();
while (it != itend) {
-
- // Normalize and expand child
- ex n = recombine_pair_to_ex(*it).bp->normal(sym_lst, repl_lst, level-1).expand();
-
- // If numerator is a sum, chop into summands
- if (is_ex_exactly_of_type(n.op(0), add)) {
- epvector::const_iterator bit = ex_to_add(n.op(0)).seq.begin(), bitend = ex_to_add(n.op(0)).seq.end();
- while (bit != bitend) {
- o.push_back((new lst(recombine_pair_to_ex(*bit), n.op(1)))->setflag(status_flags::dynallocated));
- bit++;
- }
-
- // The overall_coeff is already normalized (== rational), we just
- // split it into numerator and denominator
- GINAC_ASSERT(ex_to_numeric(ex_to_add(n.op(0)).overall_coeff).is_rational());
- numeric overall = ex_to_numeric(ex_to_add(n.op(0)).overall_coeff);
- o.push_back((new lst(overall.numer(), overall.denom() * n.op(1)))->setflag(status_flags::dynallocated));
- } else
- o.push_back(n);
+ ex n = ex_to<basic>(recombine_pair_to_ex(*it)).normal(sym_lst, repl_lst, level-1);
+ nums.push_back(n.op(0));
+ dens.push_back(n.op(1));
it++;
}
- o.push_back(overall_coeff.bp->normal(sym_lst, repl_lst, level-1));
-
- // o is now a vector of {numerator, denominator} lists
-
- // Determine common denominator
- ex den = _ex1();
- exvector::const_iterator ait = o.begin(), aitend = o.end();
-//std::clog << "add::normal uses the following summands:\n";
- while (ait != aitend) {
-//std::clog << " num = " << ait->op(0) << ", den = " << ait->op(1) << endl;
- den = lcm(ait->op(1), den, false);
- ait++;
- }
-//std::clog << " common denominator = " << den << endl;
-
- // Add fractions
- if (den.is_equal(_ex1())) {
-
- // Common denominator is 1, simply add all fractions
- exvector num_seq;
- for (ait=o.begin(); ait!=aitend; ait++) {
- num_seq.push_back(ait->op(0) / ait->op(1));
- }
- return (new lst((new add(num_seq))->setflag(status_flags::dynallocated), den))->setflag(status_flags::dynallocated);
-
- } else {
-
- // Perform fractional addition
- exvector num_seq;
- for (ait=o.begin(); ait!=aitend; ait++) {
- ex q;
- if (!divide(den, ait->op(1), q, false)) {
- // should not happen
- throw(std::runtime_error("invalid expression in add::normal, division failed"));
- }
- num_seq.push_back((ait->op(0) * q).expand());
+ ex n = ex_to<numeric>(overall_coeff).normal(sym_lst, repl_lst, level-1);
+ nums.push_back(n.op(0));
+ dens.push_back(n.op(1));
+ GINAC_ASSERT(nums.size() == dens.size());
+
+ // Now, nums is a vector of all numerators and dens is a vector of
+ // all denominators
+//std::clog << "add::normal uses " << nums.size() << " summands:\n";
+
+ // Add fractions sequentially
+ exvector::const_iterator num_it = nums.begin(), num_itend = nums.end();
+ exvector::const_iterator den_it = dens.begin(), den_itend = dens.end();
+//std::clog << " num = " << *num_it << ", den = " << *den_it << std::endl;
+ ex num = *num_it++, den = *den_it++;
+ while (num_it != num_itend) {
+//std::clog << " num = " << *num_it << ", den = " << *den_it << std::endl;
+ ex next_num = *num_it++, next_den = *den_it++;
+
+ // Trivially add sequences of fractions with identical denominators
+ while ((den_it != den_itend) && next_den.is_equal(*den_it)) {
+ next_num += *num_it;
+ num_it++; den_it++;
}
- ex num = (new add(num_seq))->setflag(status_flags::dynallocated);
- // Cancel common factors from num/den
- return frac_cancel(num, den);
+ // Additiion of two fractions, taking advantage of the fact that
+ // the heuristic GCD algorithm computes the cofactors at no extra cost
+ ex co_den1, co_den2;
+ ex g = gcd(den, next_den, &co_den1, &co_den2, false);
+ num = ((num * co_den2) + (next_num * co_den1)).expand();
+ den *= co_den2; // this is the lcm(den, next_den)
}
+//std::clog << " common denominator = " << den << std::endl;
+
+ // Cancel common factors from num/den
+ return frac_cancel(num, den);
}
ex mul::normal(lst &sym_lst, lst &repl_lst, int level) const
{
if (level == 1)
- return (new lst(*this, _ex1()))->setflag(status_flags::dynallocated);
+ return (new lst(replace_with_symbol(*this, sym_lst, repl_lst), _ex1))->setflag(status_flags::dynallocated);
else if (level == -max_recursion_level)
throw(std::runtime_error("max recursion level reached"));
// Normalize children, separate into numerator and denominator
- ex num = _ex1();
- ex den = _ex1();
+ exvector num; num.reserve(seq.size());
+ exvector den; den.reserve(seq.size());
ex n;
epvector::const_iterator it = seq.begin(), itend = seq.end();
while (it != itend) {
- n = recombine_pair_to_ex(*it).bp->normal(sym_lst, repl_lst, level-1);
- num *= n.op(0);
- den *= n.op(1);
+ n = ex_to<basic>(recombine_pair_to_ex(*it)).normal(sym_lst, repl_lst, level-1);
+ num.push_back(n.op(0));
+ den.push_back(n.op(1));
it++;
}
- n = overall_coeff.bp->normal(sym_lst, repl_lst, level-1);
- num *= n.op(0);
- den *= n.op(1);
+ n = ex_to<numeric>(overall_coeff).normal(sym_lst, repl_lst, level-1);
+ num.push_back(n.op(0));
+ den.push_back(n.op(1));
// Perform fraction cancellation
- return frac_cancel(num, den);
+ return frac_cancel((new mul(num))->setflag(status_flags::dynallocated),
+ (new mul(den))->setflag(status_flags::dynallocated));
}
ex power::normal(lst &sym_lst, lst &repl_lst, int level) const
{
if (level == 1)
- return (new lst(*this, _ex1()))->setflag(status_flags::dynallocated);
+ return (new lst(replace_with_symbol(*this, sym_lst, repl_lst), _ex1))->setflag(status_flags::dynallocated);
else if (level == -max_recursion_level)
throw(std::runtime_error("max recursion level reached"));
- // Normalize basis
- ex n = basis.bp->normal(sym_lst, repl_lst, level-1);
+ // Normalize basis and exponent (exponent gets reassembled)
+ ex n_basis = ex_to<basic>(basis).normal(sym_lst, repl_lst, level-1);
+ ex n_exponent = ex_to<basic>(exponent).normal(sym_lst, repl_lst, level-1);
+ n_exponent = n_exponent.op(0) / n_exponent.op(1);
- if (exponent.info(info_flags::integer)) {
+ if (n_exponent.info(info_flags::integer)) {
- if (exponent.info(info_flags::positive)) {
+ if (n_exponent.info(info_flags::positive)) {
// (a/b)^n -> {a^n, b^n}
- return (new lst(power(n.op(0), exponent), power(n.op(1), exponent)))->setflag(status_flags::dynallocated);
+ return (new lst(power(n_basis.op(0), n_exponent), power(n_basis.op(1), n_exponent)))->setflag(status_flags::dynallocated);
- } else if (exponent.info(info_flags::negative)) {
+ } else if (n_exponent.info(info_flags::negative)) {
// (a/b)^-n -> {b^n, a^n}
- return (new lst(power(n.op(1), -exponent), power(n.op(0), -exponent)))->setflag(status_flags::dynallocated);
+ return (new lst(power(n_basis.op(1), -n_exponent), power(n_basis.op(0), -n_exponent)))->setflag(status_flags::dynallocated);
}
} else {
- if (exponent.info(info_flags::positive)) {
+ if (n_exponent.info(info_flags::positive)) {
// (a/b)^x -> {sym((a/b)^x), 1}
- return (new lst(replace_with_symbol(power(n.op(0) / n.op(1), exponent), sym_lst, repl_lst), _ex1()))->setflag(status_flags::dynallocated);
+ return (new lst(replace_with_symbol(power(n_basis.op(0) / n_basis.op(1), n_exponent), sym_lst, repl_lst), _ex1))->setflag(status_flags::dynallocated);
- } else if (exponent.info(info_flags::negative)) {
+ } else if (n_exponent.info(info_flags::negative)) {
- if (n.op(1).is_equal(_ex1())) {
+ if (n_basis.op(1).is_equal(_ex1)) {
// a^-x -> {1, sym(a^x)}
- return (new lst(_ex1(), replace_with_symbol(power(n.op(0), -exponent), sym_lst, repl_lst)))->setflag(status_flags::dynallocated);
+ return (new lst(_ex1, replace_with_symbol(power(n_basis.op(0), -n_exponent), sym_lst, repl_lst)))->setflag(status_flags::dynallocated);
} else {
// (a/b)^-x -> {sym((b/a)^x), 1}
- return (new lst(replace_with_symbol(power(n.op(1) / n.op(0), -exponent), sym_lst, repl_lst), _ex1()))->setflag(status_flags::dynallocated);
+ return (new lst(replace_with_symbol(power(n_basis.op(1) / n_basis.op(0), -n_exponent), sym_lst, repl_lst), _ex1))->setflag(status_flags::dynallocated);
}
- } else { // exponent not numeric
+ } else { // n_exponent not numeric
// (a/b)^x -> {sym((a/b)^x, 1}
- return (new lst(replace_with_symbol(power(n.op(0) / n.op(1), exponent), sym_lst, repl_lst), _ex1()))->setflag(status_flags::dynallocated);
+ return (new lst(replace_with_symbol(power(n_basis.op(0) / n_basis.op(1), n_exponent), sym_lst, repl_lst), _ex1))->setflag(status_flags::dynallocated);
}
}
}
-/** Implementation of ex::normal() for pseries. It normalizes each coefficient and
- * replaces the series by a temporary symbol.
+/** Implementation of ex::normal() for pseries. It normalizes each coefficient
+ * and replaces the series by a temporary symbol.
* @see ex::normal */
ex pseries::normal(lst &sym_lst, lst &repl_lst, int level) const
{
- epvector new_seq;
- new_seq.reserve(seq.size());
-
- epvector::const_iterator it = seq.begin(), itend = seq.end();
- while (it != itend) {
- new_seq.push_back(expair(it->rest.normal(), it->coeff));
- it++;
- }
- ex n = pseries(relational(var,point), new_seq);
- return (new lst(replace_with_symbol(n, sym_lst, repl_lst), _ex1()))->setflag(status_flags::dynallocated);
-}
-
-
-/** Implementation of ex::normal() for relationals. It normalizes both sides.
- * @see ex::normal */
-ex relational::normal(lst &sym_lst, lst &repl_lst, int level) const
-{
- return (new lst(relational(lh.normal(), rh.normal(), o), _ex1()))->setflag(status_flags::dynallocated);
+ epvector newseq;
+ epvector::const_iterator i = seq.begin(), end = seq.end();
+ while (i != end) {
+ ex restexp = i->rest.normal();
+ if (!restexp.is_zero())
+ newseq.push_back(expair(restexp, i->coeff));
+ ++i;
+ }
+ ex n = pseries(relational(var,point), newseq);
+ return (new lst(replace_with_symbol(n, sym_lst, repl_lst), _ex1))->setflag(status_flags::dynallocated);
}
lst sym_lst, repl_lst;
ex e = bp->normal(sym_lst, repl_lst, level);
- GINAC_ASSERT(is_ex_of_type(e, lst));
+ GINAC_ASSERT(is_a<lst>(e));
// Re-insert replaced symbols
if (sym_lst.nops() > 0)
return e.op(0) / e.op(1);
}
-/** Numerator of an expression. If the expression is not of the normal form
- * "numerator/denominator", it is first converted to this form and then the
- * numerator is returned.
+/** Get numerator of an expression. If the expression is not of the normal
+ * form "numerator/denominator", it is first converted to this form and
+ * then the numerator is returned.
*
* @see ex::normal
* @return numerator */
lst sym_lst, repl_lst;
ex e = bp->normal(sym_lst, repl_lst, 0);
- GINAC_ASSERT(is_ex_of_type(e, lst));
+ GINAC_ASSERT(is_a<lst>(e));
// Re-insert replaced symbols
if (sym_lst.nops() > 0)
return e.op(0);
}
-/** Denominator of an expression. If the expression is not of the normal form
- * "numerator/denominator", it is first converted to this form and then the
- * denominator is returned.
+/** Get denominator of an expression. If the expression is not of the normal
+ * form "numerator/denominator", it is first converted to this form and
+ * then the denominator is returned.
*
* @see ex::normal
* @return denominator */
lst sym_lst, repl_lst;
ex e = bp->normal(sym_lst, repl_lst, 0);
- GINAC_ASSERT(is_ex_of_type(e, lst));
+ GINAC_ASSERT(is_a<lst>(e));
// Re-insert replaced symbols
if (sym_lst.nops() > 0)
return e.op(1);
}
+/** Get numerator and denominator of an expression. If the expresison is not
+ * of the normal form "numerator/denominator", it is first converted to this
+ * form and then a list [numerator, denominator] is returned.
+ *
+ * @see ex::normal
+ * @return a list [numerator, denominator] */
+ex ex::numer_denom(void) const
+{
+ lst sym_lst, repl_lst;
-/** Default implementation of ex::to_rational(). It replaces the object with a
- * temporary symbol.
- * @see ex::to_rational */
+ ex e = bp->normal(sym_lst, repl_lst, 0);
+ GINAC_ASSERT(is_a<lst>(e));
+
+ // Re-insert replaced symbols
+ if (sym_lst.nops() > 0)
+ return e.subs(sym_lst, repl_lst);
+ else
+ return e;
+}
+
+
+/** Rationalization of non-rational functions.
+ * This function converts a general expression to a rational polynomial
+ * by replacing all non-rational subexpressions (like non-rational numbers,
+ * non-integer powers or functions like sin(), cos() etc.) to temporary
+ * symbols. This makes it possible to use functions like gcd() and divide()
+ * on non-rational functions by applying to_rational() on the arguments,
+ * calling the desired function and re-substituting the temporary symbols
+ * in the result. To make the last step possible, all temporary symbols and
+ * their associated expressions are collected in the list specified by the
+ * repl_lst parameter in the form {symbol == expression}, ready to be passed
+ * as an argument to ex::subs().
+ *
+ * @param repl_lst collects a list of all temporary symbols and their replacements
+ * @return rationalized expression */
ex basic::to_rational(lst &repl_lst) const
{
return replace_with_symbol(*this, repl_lst);
/** Implementation of ex::to_rational() for symbols. This returns the
- * unmodified symbol.
- * @see ex::to_rational */
+ * unmodified symbol. */
ex symbol::to_rational(lst &repl_lst) const
{
return *this;
/** Implementation of ex::to_rational() for a numeric. It splits complex
* numbers into re+I*im and replaces I and non-rational real numbers with a
- * temporary symbol.
- * @see ex::to_rational */
+ * temporary symbol. */
ex numeric::to_rational(lst &repl_lst) const
{
if (is_real()) {
/** Implementation of ex::to_rational() for powers. It replaces non-integer
- * powers by temporary symbols.
- * @see ex::to_rational */
+ * powers by temporary symbols. */
ex power::to_rational(lst &repl_lst) const
{
if (exponent.info(info_flags::integer))
}
-/** Implementation of ex::to_rational() for expairseqs.
- * @see ex::to_rational */
+/** Implementation of ex::to_rational() for expairseqs. */
ex expairseq::to_rational(lst &repl_lst) const
{
epvector s;
s.reserve(seq.size());
- for (epvector::const_iterator it=seq.begin(); it!=seq.end(); ++it) {
- s.push_back(split_ex_to_pair(recombine_pair_to_ex(*it).to_rational(repl_lst)));
- // s.push_back(combine_ex_with_coeff_to_pair((*it).rest.to_rational(repl_lst),
+ epvector::const_iterator i = seq.begin(), end = seq.end();
+ while (i != end) {
+ s.push_back(split_ex_to_pair(recombine_pair_to_ex(*i).to_rational(repl_lst)));
+ ++i;
}
ex oc = overall_coeff.to_rational(repl_lst);
if (oc.info(info_flags::numeric))
return thisexpairseq(s, overall_coeff);
- else s.push_back(combine_ex_with_coeff_to_pair(oc,_ex1()));
+ else
+ s.push_back(combine_ex_with_coeff_to_pair(oc, _ex1));
return thisexpairseq(s, default_overall_coeff());
}
-/** Rationalization of non-rational functions.
- * This function converts a general expression to a rational polynomial
- * by replacing all non-rational subexpressions (like non-rational numbers,
- * non-integer powers or functions like sin(), cos() etc.) to temporary
- * symbols. This makes it possible to use functions like gcd() and divide()
- * on non-rational functions by applying to_rational() on the arguments,
- * calling the desired function and re-substituting the temporary symbols
- * in the result. To make the last step possible, all temporary symbols and
- * their associated expressions are collected in the list specified by the
- * repl_lst parameter in the form {symbol == expression}, ready to be passed
- * as an argument to ex::subs().
- *
- * @param repl_lst collects a list of all temporary symbols and their replacements
- * @return rationalized expression */
-ex ex::to_rational(lst &repl_lst) const
-{
- return bp->to_rational(repl_lst);
-}
-
-
-#ifndef NO_NAMESPACE_GINAC
} // namespace GiNaC
-#endif // ndef NO_NAMESPACE_GINAC