Test whether linear combination of existential variables

[barvinok.git] / test.c

#include <assert.h>
#include <stdio.h>
#include <string.h>
#include <unistd.h>
#include <sys/times.h>
#include <polylib/polylibgmp.h>
#include <util.h>
#include <barvinok.h>
#include "config.h"

#ifdef HAVE_GROWING_CHERNIKOVA
#define MAXRAYS    0
#else
#define MAXRAYS  600
#endif

static void time_diff(struct tms *before, struct tms *after)
{
    long ticks = sysconf(_SC_CLK_TCK);
    printf("User: %g; Sys: %g\n", 
            (0.0 + after->tms_utime - before->tms_utime) / ticks,
            (0.0 + after->tms_stime - before->tms_stime) / ticks);
}

int main()
{
    int i, nbPol, nbVec, func, j;
    Polyhedron *A, *B, *C, *D, *E, *F, *G;
    char s[128];

    nbPol = nbVec = 0;
    fgets(s, 128, stdin);
    while ((*s=='#') ||
            ((sscanf(s, "D %d", &nbPol)<1) && (sscanf(s, "V %d", &nbVec)<1)) )
        fgets(s, 128, stdin);

    for (i = 0; i < nbPol; ++i) {
        Matrix *M = Matrix_Read();
        A = Constraints2Polyhedron(M, MAXRAYS);
        Matrix_Free(M);
        fgets(s, 128, stdin);
        while ((*s=='#') || (sscanf(s, "F %d", &func)<1))
            fgets(s, 128, stdin);

        switch(func) {
        case 0: {
            Value cb, ck;
            value_init(cb);
            value_init(ck);
            fgets(s, 128, stdin);
            /* workaround for apparent bug in older gmps */
            *strchr(s, '\n') = '\0';
            while ((*s=='#') || (value_read(ck, s) != 0)) {
                fgets(s, 128, stdin);
                /* workaround for apparent bug in older gmps */
                *strchr(s, '\n') = '\0';
            }
            barvinok_count(A, &cb, 100);
            if (value_ne(cb, ck))
                return -1;
            value_clear(cb);
            value_clear(ck);
            break;
        }
        case 1:
            Polyhedron_Print(stdout, P_VALUE_FMT, A);
            B = Polyhedron_Polar(A, MAXRAYS);
            Polyhedron_Print(stdout, P_VALUE_FMT, B);
            C = Polyhedron_Polar(B, MAXRAYS);
            Polyhedron_Print(stdout, P_VALUE_FMT, C);
            Polyhedron_Free(C);
            Polyhedron_Free(B);
            break;
        case 2:
            Polyhedron_Print(stdout, P_VALUE_FMT, A);
            for (j = 0; j < A->NbRays; ++j) {
                B = supporting_cone(A, j);
                Polyhedron_Print(stdout, P_VALUE_FMT, B);
                Polyhedron_Free(B);
            }
            break;
        case 3:
            Polyhedron_Print(stdout, P_VALUE_FMT, A);
            C = B = NULL;
            barvinok_decompose(A,&B,&C);
            puts("Pos:");
            Polyhedron_Print(stdout, P_VALUE_FMT, B);
            puts("Neg:");
            Polyhedron_Print(stdout, P_VALUE_FMT, C);
            Domain_Free(B);
            Domain_Free(C);
            break;
        case 4: {
            Value cm, cb;
            struct tms tms_before, tms_between, tms_after;
            value_init(cm);
            value_init(cb);
            Polyhedron_Print(stdout, P_VALUE_FMT, A);
            times(&tms_before);
            manual_count(A, &cm);
            times(&tms_between);
            barvinok_count(A, &cb, 100);
            times(&tms_after);
            printf("manual: ");
            value_print(stdout, P_VALUE_FMT, cm);
            puts("");
            time_diff(&tms_before, &tms_between);
            printf("Barvinok: ");
            value_print(stdout, P_VALUE_FMT, cb);
            puts("");
            time_diff(&tms_between, &tms_after);
            value_clear(cm);
            value_clear(cb);
            break;
        }
        case 5:
            Polyhedron_Print(stdout, P_VALUE_FMT, A);
            B = triangularize_cone(A, 100);
            Polyhedron_Print(stdout, P_VALUE_FMT, B);
            check_triangulization(A, B);
            Domain_Free(B);
            break;
        case 6:
            Polyhedron_Print(stdout, P_VALUE_FMT, A);
            B = remove_equalities(A);
            Polyhedron_Print(stdout, P_VALUE_FMT, B);
            Polyhedron_Free(B);
            break;
        case 7: {
            Value f;
            value_init(f);
            Polyhedron_Print(stdout, P_VALUE_FMT, A);
            B = Polyhedron_Reduce(A, &f);
            Polyhedron_Print(stdout, P_VALUE_FMT, B);
            Polyhedron_Free(B);
            printf("factor: ");
            value_print(stdout, P_VALUE_FMT, f);
            puts("");
            value_clear(f);
            break;
        }
        case 8: {
            Enumeration *en;
            Matrix *M = Matrix_Read();
            char **param_name;
            C = Constraints2Polyhedron(M, MAXRAYS);
            Matrix_Free(M);
            Polyhedron_Print(stdout, P_VALUE_FMT, A);
            Polyhedron_Print(stdout, P_VALUE_FMT, C);
            en = barvinok_enumerate(A, C, MAXRAYS);
            param_name = Read_ParamNames(stdin, C->Dimension);
            print_evalue(stdout, &en->EP, param_name);
            Enumeration_Free(en);
            Polyhedron_Free(C);
        }
        case 9:
            Polyhedron_Print(stdout, P_VALUE_FMT, A);
            Polyhedron_Polarize(A);
            C = B = NULL;
            barvinok_decompose(A,&B,&C);
            for (D = B; D; D = D->next)
                Polyhedron_Polarize(D);
            for (D = C; D; D = D->next)
                Polyhedron_Polarize(D);
            puts("Pos:");
            Polyhedron_Print(stdout, P_VALUE_FMT, B);
            puts("Neg:");
            Polyhedron_Print(stdout, P_VALUE_FMT, C);
            Domain_Free(B);
            Domain_Free(C);
            break;
        }
        Polyhedron_Free(A);
    }
    for (i = 0; i < nbVec; ++i) {
        Vector *V = Vector_Read();
        Matrix *M = unimodular_complete(V);
        Matrix_Print(stdout, P_VALUE_FMT, M);
        Matrix_Free(M);
        Vector_Free(V);
    }

    return 0;
}