/** @file exam_lsolve.cpp * * These exams test solving small linear systems of symbolic equations. */ /* * GiNaC Copyright (C) 1999-2003 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 * the Free Software Foundation; either version 2 of the License, or * (at your option) any later version. * * This program is distributed in the hope that it will be useful, * but WITHOUT ANY WARRANTY; without even the implied warranty of * MERCHANTABILITY or FITNESS FOR A PARTICULAR PURPOSE. See the * GNU General Public License for more details. * * You should have received a copy of the GNU General Public License * along with this program; if not, write to the Free Software * Foundation, Inc., 59 Temple Place, Suite 330, Boston, MA 02111-1307 USA */ #include "exams.h" static unsigned exam_lsolve1() { // A trivial example. unsigned result = 0; symbol x("x"); ex eq, aux; eq = (3*x+5 == numeric(8)); aux = lsolve(eq, x); if (aux != 1) { ++result; clog << "solution of 3*x+5==8 erroneously returned " << aux << endl; } return result; } static unsigned exam_lsolve2a() { // An example from the Maple online help. unsigned result = 0; symbol a("a"), b("b"), x("x"), y("y"); lst eqns, vars; ex sol; // Create the linear system [a*x+b*y==3,x-y==b]... eqns.append(a*x+b*y==3).append(x-y==b); // ...to be solved for [x,y]... vars.append(x).append(y); // ...and solve it: sol = lsolve(eqns, vars); ex sol_x = sol.op(0).rhs(); // rhs of solution for first variable (x) ex sol_y = sol.op(1).rhs(); // rhs of solution for second variable (y) // It should have returned [x==(3+b^2)/(a+b),y==(3-a*b)/(a+b)] if (!normal(sol_x - (3+pow(b,2))/(a+b)).is_zero() || !normal(sol_y - (3-a*b)/(a+b)).is_zero()) { ++result; clog << "solution of the system " << eqns << " for " << vars << " erroneously returned " << sol << endl; } return result; } static unsigned exam_lsolve2b() { // A boring example from Mathematica's online help. unsigned result = 0; symbol x("x"), y("y"); lst eqns, vars; ex sol; // Create the linear system [3*x+y==7,2*x-5*y==8]... eqns.append(3*x+y==7).append(2*x-5*y==8); // ...to be solved for [x,y]... vars.append(x).append(y); // ...and solve it: sol = lsolve(eqns, vars); ex sol_x = sol.op(0).rhs(); // rhs of solution for first variable (x) ex sol_y = sol.op(1).rhs(); // rhs of solution for second variable (y) // It should have returned [x==43/17,y==-10/17] if ((sol_x != numeric(43,17)) || (sol_y != numeric(-10,17))) { ++result; clog << "solution of the system " << eqns << " for " << vars << " erroneously returned " << sol << endl; } return result; } static unsigned exam_lsolve2c() { // A more interesting example from the Maple online help. unsigned result = 0; symbol x("x"), y("y"); lst eqns, vars; ex sol; // Create the linear system [I*x+y==1,I*x-y==2]... eqns.append(I*x+y==1).append(I*x-y==2); // ...to be solved for [x,y]... vars.append(x).append(y); // ...and solve it: sol = lsolve(eqns, vars); ex sol_x = sol.op(0).rhs(); // rhs of solution for first variable (x) ex sol_y = sol.op(1).rhs(); // rhs of solution for second variable (y) // It should have returned [x==-3/2*I,y==-1/2] if ((sol_x != numeric(-3,2)*I) || (sol_y != numeric(-1,2))) { ++result; clog << "solution of the system " << eqns << " for " << vars << " erroneously returned " << sol << endl; } return result; } static unsigned exam_lsolve2S() { // A degenerate example that went wrong in GiNaC 0.6.2. unsigned result = 0; symbol x("x"), y("y"), t("t"); lst eqns, vars; ex sol; // Create the linear system [0*x+0*y==0,0*x+1*y==t]... eqns.append(0*x+0*y==0).append(0*x+1*y==t); // ...to be solved for [x,y]... vars.append(x).append(y); // ...and solve it: sol = lsolve(eqns, vars); ex sol_x = sol.op(0).rhs(); // rhs of solution for first variable (x) ex sol_y = sol.op(1).rhs(); // rhs of solution for second variable (y) // It should have returned [x==x,y==t] if ((sol_x != x) || (sol_y != t)) { ++result; clog << "solution of the system " << eqns << " for " << vars << " erroneously returned " << sol << endl; } return result; } static unsigned exam_lsolve3S() { // A degenerate example that went wrong while trying to improve elimination unsigned result = 0; symbol b("b"), c("c"); symbol x("x"), y("y"), z("z"); lst eqns, vars; ex sol; // Create the linear system [y+z==b,-y+z==c] with one additional row... eqns.append(ex(0)==ex(0)).append(b==z+y).append(c==z-y); // ...to be solved for [x,y,z]... vars.append(x).append(y).append(z); // ...and solve it: sol = lsolve(eqns, vars); ex sol_x = sol.op(0).rhs(); // rhs of solution for first variable (x) ex sol_y = sol.op(1).rhs(); // rhs of solution for second variable (y) ex sol_z = sol.op(2).rhs(); // rhs of solution for third variable (z) // It should have returned [x==x,y==t,] if ((sol_x != x) || (sol_y != (b-c)/2) || (sol_z != (b+c)/2)) { ++result; clog << "solution of the system " << eqns << " for " << vars << " erroneously returned " << sol << endl; } return result; } unsigned exam_lsolve() { unsigned result = 0; cout << "examining linear solve" << flush; clog << "----------linear solve:" << endl; result += exam_lsolve1(); cout << '.' << flush; result += exam_lsolve2a(); cout << '.' << flush; result += exam_lsolve2b(); cout << '.' << flush; result += exam_lsolve2c(); cout << '.' << flush; result += exam_lsolve2S(); cout << '.' << flush; result += exam_lsolve3S(); cout << '.' << flush; if (!result) { cout << " passed " << endl; clog << "(no output)" << endl; } else { cout << " failed " << endl; } return result; }