gen_fun::Hadamard_product: don't assume equalities are independent

[barvinok.git] / lattice_point.cc

#include <gmp.h>
#include <NTL/mat_ZZ.h>
#include <NTL/vec_ZZ.h>
extern "C" {
#include <polylib/polylibgmp.h>
}
#include <barvinok/barvinok.h>
#include <barvinok/evalue.h>
#include <barvinok/util.h>
#include "config.h"
#include "conversion.h"
#include "lattice_point.h"

#define ALLOC(type) (type*)malloc(sizeof(type))

/* returns an evalue that corresponds to
 *
 * c/(*den) x_param
 */
static evalue *term(int param, ZZ& c, Value *den = NULL)
{
    evalue *EP = new evalue();
    value_init(EP->d);
    value_set_si(EP->d,0);
    EP->x.p = new_enode(polynomial, 2, param + 1);
    evalue_set_si(&EP->x.p->arr[0], 0, 1);
    value_init(EP->x.p->arr[1].x.n);
    if (den == NULL)
        value_set_si(EP->x.p->arr[1].d, 1);
    else
        value_assign(EP->x.p->arr[1].d, *den);
    zz2value(c, EP->x.p->arr[1].x.n);
    return EP;
}

/* returns an evalue that corresponds to
 *
 *   sum_i p[i] * x_i
 */
evalue *multi_monom(vec_ZZ& p)
{
    evalue *X = new evalue();
    value_init(X->d);
    value_init(X->x.n);
    unsigned nparam = p.length()-1;
    zz2value(p[nparam], X->x.n);
    value_set_si(X->d, 1);
    for (int i = 0; i < nparam; ++i) {
        if (p[i] == 0)
            continue;
        evalue *T = term(i, p[i]);
        eadd(T, X); 
        free_evalue_refs(T); 
        delete T;
    }
    return X;
}

/*
 * Check whether mapping polyhedron P on the affine combination
 * num yields a range that has a fixed quotient on integer
 * division by d
 * If zero is true, then we are only interested in the quotient
 * for the cases where the remainder is zero.
 * Returns NULL if false and a newly allocated value if true.
 */
static Value *fixed_quotient(Polyhedron *P, vec_ZZ& num, Value d, bool zero)
{
    Value* ret = NULL;
    int len = num.length();
    Matrix *T = Matrix_Alloc(2, len);
    zz2values(num, T->p[0]);
    value_set_si(T->p[1][len-1], 1);
    Polyhedron *I = Polyhedron_Image(P, T, P->NbConstraints);
    Matrix_Free(T);

    int i;
    for (i = 0; i < I->NbRays; ++i)
        if (value_zero_p(I->Ray[i][2])) {
            Polyhedron_Free(I);
            return NULL;
        }

    Value min, max;
    value_init(min);
    value_init(max);
    int bounded = line_minmax(I, &min, &max);
    assert(bounded);

    if (zero)
        mpz_cdiv_q(min, min, d);
    else
        mpz_fdiv_q(min, min, d);
    mpz_fdiv_q(max, max, d);

    if (value_eq(min, max)) {
        ret = ALLOC(Value);
        value_init(*ret);
        value_assign(*ret, min);
    } 
    value_clear(min);
    value_clear(max);
    return ret;
}

/*
 * Normalize linear expression coef modulo m
 * Removes common factor and reduces coefficients
 * Returns index of first non-zero coefficient or len
 */
int normal_mod(Value *coef, int len, Value *m)
{
    Value gcd;
    value_init(gcd);

    Vector_Gcd(coef, len, &gcd);
    Gcd(gcd, *m, &gcd);
    Vector_AntiScale(coef, coef, gcd, len);

    value_division(*m, *m, gcd);
    value_clear(gcd);

    if (value_one_p(*m))
        return len;

    int j;
    for (j = 0; j < len; ++j)
        mpz_fdiv_r(coef[j], coef[j], *m);
    for (j = 0; j < len; ++j)
        if (value_notzero_p(coef[j]))
            break;

    return j;
}

static bool mod_needed(Polyhedron *PD, vec_ZZ& num, Value d, evalue *E)
{
    Value *q = fixed_quotient(PD, num, d, false);

    if (!q)
        return true;

    value_oppose(*q, *q);
    evalue EV;
    value_init(EV.d);
    value_set_si(EV.d, 1);
    value_init(EV.x.n);
    value_multiply(EV.x.n, *q, d);
    eadd(&EV, E);
    free_evalue_refs(&EV); 
    value_clear(*q);
    free(q);
    return false;
}

/* modifies f argument ! */
static void ceil_mod(Value *coef, int len, Value d, ZZ& f, evalue *EP, Polyhedron *PD)
{
    Value m;
    value_init(m);
    value_set_si(m, -1);

    Vector_Scale(coef, coef, m, len);

    value_assign(m, d);
    int j = normal_mod(coef, len, &m);

    if (j == len) {
        value_clear(m);
        return;
    }

    vec_ZZ num;
    values2zz(coef, num, len);

    ZZ g;
    value2zz(m, g);

    evalue tmp;
    value_init(tmp.d);
    evalue_set_si(&tmp, 0, 1);

    int p = j;
    if (g % 2 == 0)
        while (j < len-1 && (num[j] == g/2 || num[j] == 0))
            ++j;
    if ((j < len-1 && num[j] > g/2) || (j == len-1 && num[j] >= (g+1)/2)) {
        for (int k = j; k < len-1; ++k)
            if (num[k] != 0)
                num[k] = g - num[k];
        num[len-1] = g - 1 - num[len-1];
        value_assign(tmp.d, m);
        ZZ t = f*(g-1);
        zz2value(t, tmp.x.n);
        eadd(&tmp, EP);
        f = -f;
    }

    if (p >= len-1) {
        ZZ t = num[len-1] * f;
        zz2value(t, tmp.x.n);
        value_assign(tmp.d, m);
        eadd(&tmp, EP);
    } else {
        evalue *E = multi_monom(num);
        evalue EV;
        value_init(EV.d);

        if (PD && !mod_needed(PD, num, m, E)) {
            value_init(EV.x.n);
            zz2value(f, EV.x.n);
            value_assign(EV.d, m);
            emul(&EV, E);
            eadd(E, EP);
        } else {
            value_init(EV.x.n);
            value_set_si(EV.x.n, 1);
            value_assign(EV.d, m);
            emul(&EV, E);
            value_clear(EV.x.n);
            value_set_si(EV.d, 0);
            EV.x.p = new_enode(fractional, 3, -1);
            evalue_copy(&EV.x.p->arr[0], E);
            evalue_set_si(&EV.x.p->arr[1], 0, 1);
            value_init(EV.x.p->arr[2].x.n);
            zz2value(f, EV.x.p->arr[2].x.n);
            value_set_si(EV.x.p->arr[2].d, 1);

            eadd(&EV, EP);
        }

        free_evalue_refs(&EV); 
        free_evalue_refs(E); 
        delete E;
    }

    free_evalue_refs(&tmp); 

out:
    value_clear(m);
}

#ifdef USE_MODULO
static void ceil(Value *coef, int len, Value d, ZZ& f, 
                 evalue *EP, Polyhedron *PD) {
    ceil_mod(coef, len, d, f, EP, PD);
}
#else
static void ceil(Value *coef, int len, Value d, ZZ& f, 
                 evalue *EP, Polyhedron *PD) {
    ceil_mod(coef, len, d, f, EP, PD);
    evalue_mod2table(EP, len-1);
}
#endif

evalue* bv_ceil3(Value *coef, int len, Value d, Polyhedron *P)
{
    Vector *val = Vector_Alloc(len);

    Value t;
    value_init(t);
    value_set_si(t, -1);
    Vector_Scale(coef, val->p, t, len);
    value_absolute(t, d);

    vec_ZZ num;
    values2zz(val->p, num, len);
    evalue *EP = multi_monom(num);

    evalue tmp;
    value_init(tmp.d);
    value_init(tmp.x.n);
    value_set_si(tmp.x.n, 1);
    value_assign(tmp.d, t);

    emul(&tmp, EP);

    ZZ one;
    one = 1;
    ceil_mod(val->p, len, t, one, EP, P);
    value_clear(t);

    /* copy EP to malloc'ed evalue */
    evalue *E = ALLOC(evalue);
    *E = *EP;
    delete EP;

    free_evalue_refs(&tmp); 
    Vector_Free(val);

    return E;
}

void lattice_point(Value* values, Polyhedron *i, vec_ZZ& vertex)
{
    unsigned dim = i->Dimension;
    if(!value_one_p(values[dim])) {
        Matrix* Rays = rays(i);
        Matrix *inv = Matrix_Alloc(Rays->NbRows, Rays->NbColumns);
        int ok = Matrix_Inverse(Rays, inv);
        assert(ok);
        Matrix_Free(Rays);
        Rays = rays(i);
        Vector *lambda = Vector_Alloc(dim+1);
        Vector_Matrix_Product(values, inv, lambda->p);
        Matrix_Free(inv);
        for (int j = 0; j < dim; ++j)
            mpz_cdiv_q(lambda->p[j], lambda->p[j], lambda->p[dim]);
        value_set_si(lambda->p[dim], 1);
        Vector *A = Vector_Alloc(dim+1);
        Vector_Matrix_Product(lambda->p, Rays, A->p);
        Vector_Free(lambda);
        Matrix_Free(Rays);
        values2zz(A->p, vertex, dim);
        Vector_Free(A);
    } else
        values2zz(values, vertex, dim);
}

static void vertex_period(
                    Polyhedron *i, vec_ZZ& lambda, Matrix *T, 
                    Value lcm, int p, Vector *val, 
                    evalue *E, evalue* ev,
                    ZZ& offset)
{
    unsigned nparam = T->NbRows - 1;
    unsigned dim = i->Dimension;
    Value tmp;
    ZZ nump;

    if (p == nparam) {
        vec_ZZ vertex;
        ZZ num, l;
        Vector * values = Vector_Alloc(dim + 1);
        Vector_Matrix_Product(val->p, T, values->p);
        value_assign(values->p[dim], lcm);
        lattice_point(values->p, i, vertex);
        num = vertex * lambda;
        value2zz(lcm, l);
        num *= l;
        num += offset;
        value_init(ev->x.n);
        zz2value(num, ev->x.n);
        value_assign(ev->d, lcm);
        Vector_Free(values);
        return;
    }

    value_init(tmp);
    vec_ZZ vertex;
    values2zz(T->p[p], vertex, dim);
    nump = vertex * lambda;
    if (First_Non_Zero(val->p, p) == -1) {
        value_assign(tmp, lcm);
        evalue *ET = term(p, nump, &tmp);
        eadd(ET, E);   
        free_evalue_refs(ET); 
        delete ET;
    }

    value_assign(tmp, lcm);
    if (First_Non_Zero(T->p[p], dim) != -1)
        Vector_Gcd(T->p[p], dim, &tmp);
    Gcd(tmp, lcm, &tmp);
    if (value_lt(tmp, lcm)) {
        ZZ count;

        value_division(tmp, lcm, tmp);
        value_set_si(ev->d, 0);
        ev->x.p = new_enode(periodic, VALUE_TO_INT(tmp), p+1);
        value2zz(tmp, count);
        do {
            value_decrement(tmp, tmp);
            --count;
            ZZ new_offset = offset - count * nump;
            value_assign(val->p[p], tmp);
            vertex_period(i, lambda, T, lcm, p+1, val, E, 
                          &ev->x.p->arr[VALUE_TO_INT(tmp)], new_offset);
        } while (value_pos_p(tmp));
    } else
        vertex_period(i, lambda, T, lcm, p+1, val, E, ev, offset);
    value_clear(tmp);
}

/* Returns the power of (t+1) in the term of a rational generating function,
 * i.e., the scalar product of the actual lattice point and lambda.
 * The lattice point is the unique lattice point in the fundamental parallelepiped
 * of the unimodual cone i shifted to the parametric vertex W/lcm.
 *
 * The rows of W refer to the coordinates of the vertex
 * The first nparam columns are the coefficients of the parameters
 * and the final column is the constant term.
 * lcm is the common denominator of all coefficients.
 *
 * PD is the parameter domain, which, if != NULL, may be used to simply the
 * resulting expression.
 */
#ifdef USE_MODULO
evalue* lattice_point(
    Polyhedron *i, vec_ZZ& lambda, Matrix *W, Value lcm, Polyhedron *PD)
{
    unsigned nparam = W->NbColumns - 1;

    Matrix* Rays = rays2(i);
    Matrix *T = Transpose(Rays);
    Matrix *T2 = Matrix_Copy(T);
    Matrix *inv = Matrix_Alloc(T2->NbRows, T2->NbColumns);
    int ok = Matrix_Inverse(T2, inv);
    assert(ok);
    Matrix_Free(Rays);
    Matrix_Free(T2);
    mat_ZZ vertex;
    matrix2zz(W, vertex, W->NbRows, W->NbColumns);

    vec_ZZ num;
    num = lambda * vertex;

    evalue *EP = multi_monom(num);

    evalue tmp;
    value_init(tmp.d);
    value_init(tmp.x.n);
    value_set_si(tmp.x.n, 1);
    value_assign(tmp.d, lcm);

    emul(&tmp, EP);

    Matrix *L = Matrix_Alloc(inv->NbRows, W->NbColumns);
    Matrix_Product(inv, W, L);

    mat_ZZ RT;
    matrix2zz(T, RT, T->NbRows, T->NbColumns);
    Matrix_Free(T);

    vec_ZZ p = lambda * RT;

    for (int i = 0; i < L->NbRows; ++i) {
        ceil_mod(L->p[i], nparam+1, lcm, p[i], EP, PD);
    }

    Matrix_Free(L);

    Matrix_Free(inv);
    free_evalue_refs(&tmp); 
    return EP;
}
#else
evalue* lattice_point(
    Polyhedron *i, vec_ZZ& lambda, Matrix *W, Value lcm, Polyhedron *PD)
{
    Matrix *T = Transpose(W);
    unsigned nparam = T->NbRows - 1;

    evalue *EP = new evalue();
    value_init(EP->d);
    evalue_set_si(EP, 0, 1);

    evalue ev;
    Vector *val = Vector_Alloc(nparam+1);
    value_set_si(val->p[nparam], 1);
    ZZ offset(INIT_VAL, 0);
    value_init(ev.d);
    vertex_period(i, lambda, T, lcm, 0, val, EP, &ev, offset);
    Vector_Free(val);
    eadd(&ev, EP);
    free_evalue_refs(&ev);   

    Matrix_Free(T);

    reduce_evalue(EP);

    return EP;
}
#endif

/* returns the unique lattice point in the fundamental parallelepiped
 * of the unimodual cone C shifted to the parametric vertex V.
 *
 * The return values num and E_vertex are such that
 * coordinate i of this lattice point is equal to
 *
 *          num[i] + E_vertex[i]
 */
void lattice_point(Param_Vertices *V, Polyhedron *C, vec_ZZ& num, 
                   evalue **E_vertex)
{
    unsigned nparam = V->Vertex->NbColumns - 2;
    unsigned dim = C->Dimension;
    vec_ZZ vertex;
    vertex.SetLength(nparam+1);

    Value lcm, tmp;
    value_init(lcm);
    value_init(tmp);
    value_set_si(lcm, 1);

    for (int j = 0; j < V->Vertex->NbRows; ++j) {
        value_lcm(lcm, V->Vertex->p[j][nparam+1], &lcm);
    }

    if (value_notone_p(lcm)) {
        Matrix * mv = Matrix_Alloc(dim, nparam+1);
        for (int j = 0 ; j < dim; ++j) {
            value_division(tmp, lcm, V->Vertex->p[j][nparam+1]);
            Vector_Scale(V->Vertex->p[j], mv->p[j], tmp, nparam+1);
        }

        Matrix* Rays = rays2(C);
        Matrix *T = Transpose(Rays);
        Matrix *T2 = Matrix_Copy(T);
        Matrix *inv = Matrix_Alloc(T2->NbRows, T2->NbColumns);
        int ok = Matrix_Inverse(T2, inv);
        assert(ok);
        Matrix_Free(Rays);
        Matrix_Free(T2);
        Matrix *L = Matrix_Alloc(inv->NbRows, mv->NbColumns);
        Matrix_Product(inv, mv, L);
        Matrix_Free(inv);

        evalue f;
        value_init(f.d);
        value_init(f.x.n);

        ZZ one;

        evalue *remainders[dim];
        for (int i = 0; i < dim; ++i) {
            remainders[i] = evalue_zero();
            one = 1;
            ceil(L->p[i], nparam+1, lcm, one, remainders[i], 0);
        }
        Matrix_Free(L);


        for (int i = 0; i < V->Vertex->NbRows; ++i) {
            values2zz(mv->p[i], vertex, nparam+1);
            E_vertex[i] = multi_monom(vertex);
            num[i] = 0;

            value_set_si(f.x.n, 1);
            value_assign(f.d, lcm);

            emul(&f, E_vertex[i]);

            for (int j = 0; j < dim; ++j) {
                if (value_zero_p(T->p[i][j]))
                    continue;
                evalue cp;
                value_init(cp.d);
                evalue_copy(&cp, remainders[j]);
                if (value_notone_p(T->p[i][j])) {
                    value_set_si(f.d, 1);
                    value_assign(f.x.n, T->p[i][j]);
                    emul(&f, &cp);
                }
                eadd(&cp, E_vertex[i]);
                free_evalue_refs(&cp);
            }
        }
        for (int i = 0; i < dim; ++i) {
            free_evalue_refs(remainders[i]); 
            free(remainders[i]);
        }

        free_evalue_refs(&f); 

        Matrix_Free(T);
        Matrix_Free(mv);
        value_clear(lcm);
        value_clear(tmp);
        return;
    }
    value_clear(lcm);
    value_clear(tmp);

    for (int i = 0; i < V->Vertex->NbRows; ++i) {
        /* fixed value */
        if (First_Non_Zero(V->Vertex->p[i], nparam) == -1) {
            E_vertex[i] = 0;
            value2zz(V->Vertex->p[i][nparam], num[i]);
        } else {
            values2zz(V->Vertex->p[i], vertex, nparam+1);
            E_vertex[i] = multi_monom(vertex);
            num[i] = 0;
        }
    }
}