X-Git-Url: https://www.ginac.de/ginac.git//ginac.git?p=ginac.git;a=blobdiff_plain;f=check%2Fexam_factor.cpp;h=d346efed3e07c82dce355eb63d7d0b6db440487a;hp=fa895c6dc06d7fc521e533ec604f443bd1c36d34;hb=3563317bdfee90677c041bf1cb585ad220e9b7d3;hpb=bb6b3d82cdf9e7ff4ecac89c47e63024e39ec96b diff --git a/check/exam_factor.cpp b/check/exam_factor.cpp index fa895c6d..d346efed 100644 --- a/check/exam_factor.cpp +++ b/check/exam_factor.cpp @@ -3,7 +3,7 @@ * Factorization test suite. */ /* - * GiNaC Copyright (C) 1999-2008 Johannes Gutenberg University Mainz, Germany + * GiNaC Copyright (C) 1999-2020 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 @@ -20,12 +20,11 @@ * Foundation, Inc., 51 Franklin Street, Fifth Floor, Boston, MA 02110-1301 USA */ -#include #include "ginac.h" -using namespace std; using namespace GiNaC; -static symbol w("w"), x("x"), y("y"), z("z"); +#include +using namespace std; static unsigned check_factor(const ex& e) { @@ -41,11 +40,13 @@ static unsigned check_factor(const ex& e) static unsigned exam_factor1() { unsigned result = 0; - ex e, d; + ex e; symbol x("x"); - lst syms; - syms.append(x); - + lst syms = {x}; + + e = 1; + result += check_factor(e); + e = ex("1+x-x^3", syms); result += check_factor(e); @@ -101,6 +102,181 @@ static unsigned exam_factor1() e = ex("(1+4*x)*x^2*(1-4*x+16*x^2)*(3+5*x+92*x^3)", syms); result += check_factor(e); + e = ex("(77+11*x^3+25*x^2+27*x+102*x^4)*(85+57*x^3+92*x^2+29*x+66*x^4)", syms); + result += check_factor(e); + + return result; +} + +static unsigned exam_factor2() +{ + unsigned result = 0; + ex e; + symbol x("x"), y("y"), z("z"); + lst syms = {x, y, z}; + + e = ex("x+y", syms); + result += check_factor(e); + + e = ex("(x^2-y+1)*(x+y)", syms); + result += check_factor(e); + + e = ex("-2*(x+y)*(x-y)", syms); + result += check_factor(e); + + e = ex("(16+x^2*z^3)*(-17+3*x-5*z)*(2*x+3*z)*(x-y^2-z^3)", syms); + result += check_factor(e); + + e = ex("(x-y*z)*(x-y^2-z^3)*(x+y+z)", syms); + result += check_factor(e); + + e = ex("-(y^2-x+z^3)*x*(x+y+z)", syms); + result += check_factor(e); + + e = ex("-316*(3*x-4*z)*(2*x+3*z)*(x+y)*(-1+x)", syms); + result += check_factor(e); + + e = ex("(x+x^3+z^2)*(3*x-4*z)", syms); + result += check_factor(e); + + e = ex("250*(-3+x)*(4*z-3*x)*(x^3+z^2+x)*x", syms); + result += check_factor(e); + + e = ex("327*(x+z^2+x^3)*(3*x-4*z)*(-7+5*x-x^3)*(1+x+x^2)", syms); + result += check_factor(e); + + e = ex("x-y^2-z^3", syms); + result += check_factor(e); + + e = ex("-390*(7+3*x^4)*(2+x^2)*(x-z^3-y^2)", syms); + result += check_factor(e); + + e = ex("55*(1+x)^2*(3*x-4*z)*(1+x+x^2)*(x+x^3+z^2)", syms); + result += check_factor(e); + + e = ex("x+y*x-1", syms); + result += check_factor(e); + + e = ex("390*(-1+x^6-x)*(7+3*x^4)*(2+x^2)*(y+x)*(-1+y-x^2)*(1+x^2+x)^2", syms); + result += check_factor(e); + + e = ex("310*(y+x)*(-1+y-x^2)", syms); + result += check_factor(e); + + return result; +} + +static unsigned exam_factor3() +{ + unsigned result = 0; + ex e; + symbol k("k"), n("n"); + lst syms = {k, n}; + + e = ex("1/2*(-3+3*k-n)*(-2+3*k-n)*(-1+3*k-n)", syms); + result += check_factor(e); + + e = ex("1/4*(2*k-n)*(-1+2*k-n)", syms); + result += check_factor(e); + + return result; +} + +static unsigned check_factor_expanded(const ex& e) +{ + ex ee = e.expand(); + ex answer = factor(ee); + if ( answer.expand() != ee || (!is_a(answer) && !is_a(answer)) ) { + clog << "factorization of " << e << " == " << ee << " gave wrong result: " << answer << endl; + return 1; + } + return 0; +} + +static unsigned exam_factor_content() +{ + unsigned result = 0; + ex e; + symbol x("x"), y("y"); + + // Fixed 2013-07-28 by Alexei Sheplyakov in factor_univariate(). + e = ex("174247781*x^2-1989199947807987/200000000000000", lst{x}); + result += check_factor(e); + + // Fixed 2014-05-18 by Alexei Sheplyakov in factor_multivariate(). + e = ex("(x+y+x*y)*(3*x+2*y)", lst{x, y}); + result += check_factor(e); + + return result; +} + +static unsigned exam_factor_wang() +{ + // these 15 polynomials are from the appendix of P.S.Wang, + // "An Improved Multivariate Polynomial Factoring Algorithm" + unsigned result = 0; + ex e; + symbol u("u"), w("w"), x("x"), y("y"), z("z"); + + e = ex("(z+x*y+10)*(x*z+y+30)*(y*z+x+20)", lst{x, y, z}); + result += check_factor_expanded(e); + + e = ex("(x^3*(z+y)+y-11)*(x^2*(z^2+y^2)+y+90)", lst{x, y, z}); + result += check_factor_expanded(e); + + e = ex("(y*z^3+x*y*z+y^2+x^3)*(x*(z^4+1)+z+x^3*y^2)", lst{x, y, z}); + result += check_factor_expanded(e); + + e = ex("(z^2-x^3*y+3)*(z^2+x*y^3)*(z^2+x^3*y^4)*(y^4*z^2+x^2*z+5)", lst{x, y, z}); + result += check_factor_expanded(e); + + e = ex("(z^2+x^3*y^4+u^2)*((y^2+x)*z^2+3*u^2*x^3*y^4*z+19*y^2)*(u^2*y^4*z^2+x^2*z+5)", lst{u, x, y, z}); + result += check_factor_expanded(e); + + e = ex("(w^4*z^3-x*y^2*z^2-w^4*x^5*y^6-w^2*x^3*y)*(-x^5*z^3+y*z+x^2*y^3)" + "*(w^4*z^6+y^2*z^3-w^2*x^2*y^2*z^2+x^5*z-x^4*y^2-w^3*x^3*y)", lst{w, x, y, z}); + result += check_factor_expanded(e); + + e = ex("(z+y+x-3)^3*(z+y+x-2)^2", lst{x, y, z}); + result += check_factor_expanded(e); + + e = ex("(-15*y^2*z^16+29*w^4*x^12*y^12*z^3+21*x^3*z^2+3*w^15*y^20)" + "*(-z^31-w^12*z^20+y^18-y^14+x^2*y^2+x^21+w^2)", lst{w, x, y, z}); + result += check_factor_expanded(e); + + e = ex("u^4*x*z^2*(6*w^2*y^3*z^2+18*u^2*w^3*x*z^2+15*u*z^2+10*u^2*w*x*y^3)" + "*(-44*u*w*x*y^4*z^4-25*u^2*w^3*y*z^4+8*u*w*x^3*z^4-32*u^2*w^4*y^4*z^3" + "+48*u^2*x^2*y^3*z^3-12*y^3*z^2+2*u^2*w*x^2*y^2-11*u*w^2*x^3*y-4*w^2*x)", lst{u, w, x, y, z}); + result += check_factor_expanded(e); + + e = ex("(31*u^2*x*z+35*w^2*y^2+6*x*y+40*w*x^2)*(u^2*w^2*x*y^2*z^2+24*u^2*w*x*y^2*z^2" + "+12*u^2*x*y^2*z^2+24*u^2*x^2*y*z^2+43*w*x*y*z^2+31*w^2*y*z^2+8*u^2*w^2*z^2" + "+44*u*w^2*z^2+37*u^2*y^2*z+41*y^2*z+12*w*x^2*y*z+21*u^2*w*x*y*z+23*x*y*z" + "+47*u^2*w^2*z+13*u*w^2*x^2*y^2+22*x*y^2+42*u^2*w^2*y^2+29*w^2*y^2+27*u*w^2*x^2*y" + "+37*w^2*x*z+39*u*w*x*z+43*u*x^2*y+24*x*y+9*u^2*w*x^2+22*u^2*w^2)", lst{u, w, x, y, z}); + result += check_factor_expanded(e); + + e = ex("x*y*(-13*u^3*w^2*x*y*z^3+w^3*z^3+4*u*x*y^2+47*x*y)" + "*(43*u*x^3*y^3*z^3+36*u^2*w^3*x*y*z^3+14*w^3*x^3*y^3*z^2-29*w^3*x*y^3*z^2" + "-20*u^2*w^2*x^2*y^2*z^2+36*u^2*w*x*y^3*z-48*u*x^3*y^2*z+5*u*w*x^2*y^3" + "+36*u*w^2*y^3-9*u*w*y^3-23*u*w*x^3*y^2+46*u*x^3*y^2+8*x*y^2+31*u^2*w^3*y^2" + "-9*u^2*y^2+45*x^3-46*u^2*w*x)", lst{u, w, x, y, z}); + result += check_factor_expanded(e); + + e = ex("(z+y+x-3)^3", lst{x, y, z}); + result += check_factor_expanded(e); + + e = ex("(3*z^3+2*w*z-9*y^3-y^2+45*x^3)*(w^2*z^3+47*x*y-w^2)", lst{w, x, y, z}); + result += check_factor_expanded(e); + + e = ex("(-18*x^4*y^5+22*y^5-26*x^3*y^4-38*x^2*y^4+29*x^2*y^3-41*x^4*y^2+37*x^4)" + "*(33*x^5*y^6+11*y^2+35*x^3*y-22*x^4)", lst{x, y, z}); + result += check_factor_expanded(e); + + e = ex("x^6*y^3*z^2*(3*z^3+2*w*z-8*x*y^2+14*w^2*y^2-y^2+18*x^3*y)" + "*(-12*w^2*x*y*z^3+w^2*z^3+3*x*y^2+29*x-w^2)", lst{w, x, y, z}); + result += check_factor_expanded(e); + return result; } @@ -111,6 +287,10 @@ unsigned exam_factor() cout << "examining polynomial factorization" << flush; result += exam_factor1(); cout << '.' << flush; + result += exam_factor2(); cout << '.' << flush; + result += exam_factor3(); cout << '.' << flush; + result += exam_factor_content(); cout << '.' << flush; + result += exam_factor_wang(); cout << '.' << flush; return result; }