OpenXM_contrib2/asir2018/builtin/array.c - diff

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Diff for /OpenXM_contrib2/asir2018/builtin/array.c between version 1.3 and 1.9

version 1.3, 2018/10/01 05:49:06

version 1.9, 2021/03/26 09:05:41

Line 45

* DEVELOPER SHALL HAVE NO LIABILITY IN CONNECTION WITH THE USE,

* PERFORMANCE OR NON-PERFORMANCE OF THE SOFTWARE.

* $OpenXM: OpenXM_contrib2/asir2018/builtin/array.c,v 1.2 2018/09/28 08:20:27 noro Exp $

* $OpenXM: OpenXM_contrib2/asir2018/builtin/array.c,v 1.8 2020/10/06 06:31:19 noro Exp $

#include "ca.h"

#include "base.h"

Line 170 void solve_u(int *,ent **,int,int *,int);

static int *ul,*ll;

static ent **u,**l;

static int modulus;

#if defined(ANDROID)

int getw(FILE *fp)

{

int x;

return (fread((void *)&x, sizeof(x), 1, fp) == 1 ? x : EOF);

}

#endif

void Plusolve_prep(NODE arg,Q *rp)

{

Line 615 void Pnewvect(NODE arg,VECT *rp)

Line 622 void Pnewvect(NODE arg,VECT *rp)

return;

}

#endif

for ( i = 0, tn = BDY(list), vb = BDY(vect); tn; i++, tn = NEXT(tn) )

for ( i = 0, tn = BDY(list), vb = BDY(vect); tn && i<len; i++, tn = NEXT(tn) )

vb[i] = (pointer)BDY(tn);

}

*rp = vect;

Line 1164 void Pgeneric_gauss_elim(NODE arg,LIST *rp)

Line 1171 void Pgeneric_gauss_elim(NODE arg,LIST *rp)

if ( is_hensel )

rank = generic_gauss_elim_hensel(m,&nm,&dn,&ri,&ci);

else

rank = generic_gauss_elim64(m,&nm,&dn,&ri,&ci);

rank = generic_gauss_elim(m,&nm,&dn,&ri,&ci);

t = col-rank;

MKVECT(rind,rank);

MKVECT(cind,t);

Line 1423 int gauss_elim_mod(int **mat,int row,int col,int md)

Line 1430 int gauss_elim_mod(int **mat,int row,int col,int md)

return -1;

}

struct oEGT eg_mod,eg_elim,eg_elim1,eg_elim2,eg_chrem,eg_gschk,eg_intrat,eg_symb;

struct oEGT eg_mod,eg_elim,eg_elim1,eg_elim2,eg_chrem,eg_gschk,eg_intrat,eg_symb,eg_back,eg_fore;

struct oEGT eg_conv;

#if 0

Line 1536 void lu_dec_cr(MAT mat,MAT lu,Q *dn,int **perm)

Line 1543 void lu_dec_cr(MAT mat,MAT lu,Q *dn,int **perm)

int f4_nocheck;

#define ONE_STEP1 if ( zzz = *s ) { DMAR(zzz,hc,*tj,md,*tj) } tj++; s++;

#define ONE_STEP1 if ( ( zzz = *s ) != 0 ) { DMAR(zzz,hc,*tj,md,*tj) } tj++; s++;

void reduce_reducers_mod(int **mat,int row,int col,int md)

{

Line 1552 void reduce_reducers_mod(int **mat,int row,int col,int

Line 1559 void reduce_reducers_mod(int **mat,int row,int col,int

ind[i] = j;

for ( l = i-1; l >= 0; l-- ) {

/* reduce mat[i] by mat[l] */

if ( hc = t[ind[l]] ) {

if ( ( hc = t[ind[l]] ) != 0 ) {

/* mat[i] = mat[i]-hc*mat[l] */

j = ind[l];

s = mat[l]+j;

Line 1578 void reduce_reducers_mod(int **mat,int row,int col,int

Line 1585 void reduce_reducers_mod(int **mat,int row,int col,int

ONE_STEP1 ONE_STEP1 ONE_STEP1 ONE_STEP1

}

for ( ; k > 0; k-- ) {

if ( zzz = *s ) { DMAR(zzz,hc,*tj,md,*tj) } tj++; s++;

if ( ( zzz = *s ) != 0 ) { DMAR(zzz,hc,*tj,md,*tj) } tj++; s++;

}

Line 1613 void pre_reduce_mod(int **mat,int row,int col,int nred

Line 1620 void pre_reduce_mod(int **mat,int row,int col,int nred

DMAR(t[k],inv,0,md,t[k])

for ( l = i-1; l >= 0; l-- ) {

/* reduce mat[i] by mat[l] */

if ( hc = t[ind[l]] ) {

if ( ( hc = t[ind[l]] ) != 0 ) {

/* mat[i] = mat[i]-hc*mat[l] */

for ( k = ind[l], hc = md-hc, s = mat[l]+k, tk = t+k;

k < col; k++, tk++, s++ )

Line 1627 void pre_reduce_mod(int **mat,int row,int col,int nred

Line 1634 void pre_reduce_mod(int **mat,int row,int col,int nred

t = mat[i];

for ( l = nred-1; l >= 0; l-- ) {

/* reduce mat[i] by mat[l] */

if ( hc = t[ind[l]] ) {

if ( ( hc = t[ind[l]] ) != 0 ) {

/* mat[i] = mat[i]-hc*mat[l] */

for ( k = ind[l], hc = md-hc, s = mat[l]+k, tk = t+k;

k < col; k++, tk++, s++ )

Line 1651 void reduce_sp_by_red_mod(int *sp,int **redmat,int *in

Line 1658 void reduce_sp_by_red_mod(int *sp,int **redmat,int *in

/* reduce the spolys by redmat */

for ( i = nred-1; i >= 0; i-- ) {

/* reduce sp by redmat[i] */

if ( hc = sp[ind[i]] ) {

if ( ( hc = sp[ind[i]] ) != 0 ) {

/* sp = sp-hc*redmat[i] */

j = ind[i];

hc = md-hc;

s = redmat[i]+j;

tj = sp+j;

for ( k = col-j; k > 0; k-- ) {

if ( zzz = *s ) { DMAR(zzz,hc,*tj,md,*tj) } tj++; s++;

if ( ( zzz = *s ) != 0 ) { DMAR(zzz,hc,*tj,md,*tj) } tj++; s++;

}

Line 1756 int generic_gauss_elim_mod64(mp_limb_t **mat,int row,i

Line 1763 int generic_gauss_elim_mod64(mp_limb_t **mat,int row,i

*pk = mulmod64(*pk,inv,md);

for ( i = rank+1; i < row; i++ ) {

t = mat[i];

if ( a = t[j] )

if ( ( a = t[j] ) != 0 )

red_by_vect64mod(md,t+j,pivot+j,md-a,col-j);

}

rank++;

Line 1766 int generic_gauss_elim_mod64(mp_limb_t **mat,int row,i

Line 1773 int generic_gauss_elim_mod64(mp_limb_t **mat,int row,i

pivot = mat[l];

for ( i = 0; i < l; i++ ) {

t = mat[i];

if ( a = t[j] )

if ( ( a = t[j] ) != 0 )

red_by_vect64mod(md,t+j,pivot+j,md-a,col-j);

}

l--;

Line 1774 int generic_gauss_elim_mod64(mp_limb_t **mat,int row,i

Line 1781 int generic_gauss_elim_mod64(mp_limb_t **mat,int row,i

return rank;

}

int find_lhs_and_lu_mod64(mp_limb_t **a,int row,int col,

mp_limb_t md,int **rinfo,int **cinfo)

{

int i,j,k,d;

int *rp,*cp;

mp_limb_t *t,*pivot;

mp_limb_t inv,m;

*rinfo = rp = (int *)MALLOC_ATOMIC(row*sizeof(int));

*cinfo = cp = (int *)MALLOC_ATOMIC(col*sizeof(int));

for ( i = 0; i < row; i++ )

rp[i] = i;

for ( k = 0, d = 0; k < col; k++ ) {

for ( i = d; i < row && !a[i][k]; i++ );

if ( i == row ) {

cp[k] = 0;

continue;

} else

cp[k] = 1;

if ( i != d ) {

j = rp[i]; rp[i] = rp[d]; rp[d] = j;

t = a[i]; a[i] = a[d]; a[d] = t;

}

pivot = a[d];

pivot[k] = inv = invmod64(pivot[k],md);

for ( i = d+1; i < row; i++ ) {

t = a[i];

if ( (m = t[k]) != 0 ) {

t[k] = mulmod64(inv,m,md);

for ( j = k+1, m = md - t[k]; j < col; j++ )

if ( pivot[j] ) {

t[j] = muladdmod64(m,pivot[j],t[j],md);

}

d++;

}

return d;

}

int lu_mod64(mp_limb_t **a,int n,mp_limb_t md,int **rinfo)

{

int i,j,k;

int *rp;

mp_limb_t *t,*pivot;

mp_limb_t inv,m;

*rinfo = rp = (int *)MALLOC_ATOMIC(n*sizeof(int));

for ( i = 0; i < n; i++ ) rp[i] = i;

for ( k = 0; k < n; k++ ) {

for ( i = k; i < n && !a[i][k]; i++ );

if ( i == n ) return 0;

if ( i != k ) {

j = rp[i]; rp[i] = rp[k]; rp[k] = j;

t = a[i]; a[i] = a[k]; a[k] = t;

}

pivot = a[k];

inv = invmod64(pivot[k],md);

for ( i = k+1; i < n; i++ ) {

t = a[i];

if ( (m = t[k]) != 0 ) {

t[k] = mulmod64(inv,m,md);

for ( j = k+1, m = md - t[k]; j < n; j++ )

if ( pivot[j] ) {

t[j] = muladdmod64(m,pivot[j],t[j],md);

}

return 1;

}

Input

a : n x n matrix; a result of LU-decomposition

md : modulus

b : n x l matrix

Output

b = a^(-1)b

void solve_by_lu_mod64(mp_limb_t **a,int n,mp_limb_t md,mp_limb_signed_t **b,int l,int normalize)

{

mp_limb_t *y,*c;

int i,j,k;

mp_limb_t t,m,m2;

y = (mp_limb_t *)MALLOC_ATOMIC(n*sizeof(mp_limb_t));

c = (mp_limb_t *)MALLOC_ATOMIC(n*sizeof(mp_limb_t));

m2 = md/2;

for ( k = 0; k < l; k++ ) {

/* copy b[.][k] to c */

for ( i = 0; i < n; i++ )

c[i] = b[i][k];

/* solve Ly=c */

for ( i = 0; i < n; i++ ) {

for ( t = c[i], j = 0; j < i; j++ )

if ( a[i][j] ) {

m = md - a[i][j];

t = muladdmod64(m,y[j],t,md);

}

y[i] = t;

}

/* solve Uc=y */

for ( i = n-1; i >= 0; i-- ) {

for ( t = y[i], j =i+1; j < n; j++ )

if ( a[i][j] ) {

m = md - a[i][j];

t = muladdmod64(m,c[j],t,md);

}

/* a[i][i] = 1/U[i][i] */

c[i] = mulmod64(t,a[i][i],md);

}

/* copy c to b[.][k] with normalization */

if ( normalize )

for ( i = 0; i < n; i++ )

b[i][k] = (mp_limb_signed_t)(c[i]>m2 ? c[i]-md : c[i]);

else

for ( i = 0; i < n; i++ )

b[i][k] = (mp_limb_signed_t)c[i];

}

#endif

void red_by_vect_sf(int m,unsigned int *p,unsigned int *r,unsigned int hc,int len)

Line 1815 void reduce_sp_by_red_mod_compress (int *sp,CDP *redma

Line 1944 void reduce_sp_by_red_mod_compress (int *sp,CDP *redma

for ( i = nred-1; i >= 0; i-- ) {

/* reduce sp by redmat[i] */

usp[ind[i]] %= md;

if ( hc = usp[ind[i]] ) {

if ( ( hc = usp[ind[i]] ) != 0 ) {

/* sp = sp-hc*redmat[i] */

hc = md-hc;

ri = redmat[i];

Line 1861 int generic_gauss_elim_mod(int **mat0,int row,int col,

Line 1990 int generic_gauss_elim_mod(int **mat0,int row,int col,

}

for ( i = rank+1; i < row; i++ ) {

t = mat[i];

if ( a = t[j] )

if ( ( a = t[j] ) != 0 )

red_by_vect(md,t+j,pivot+j,md-a,col-j);

}

rank++;

Line 1872 int generic_gauss_elim_mod(int **mat0,int row,int col,

Line 2001 int generic_gauss_elim_mod(int **mat0,int row,int col,

for ( i = 0; i < l; i++ ) {

t = mat[i];

t[j] %= md;

if ( a = t[j] )

if ( ( a = t[j] ) != 0 )

red_by_vect(md,t+j,pivot+j,md-a,col-j);

}

l--;

Line 1921 int generic_gauss_elim_mod2(int **mat0,int row,int col

Line 2050 int generic_gauss_elim_mod2(int **mat0,int row,int col

}

for ( i = rank+1; i < row; i++ ) {

t = mat[i];

if ( a = t[j] )

if ( ( a = t[j] ) != 0 )

red_by_vect(md,t+j,pivot+j,md-a,col-j);

}

rank++;

Line 1932 int generic_gauss_elim_mod2(int **mat0,int row,int col

Line 2061 int generic_gauss_elim_mod2(int **mat0,int row,int col

for ( i = 0; i < l; i++ ) {

t = mat[i];

t[j] %= md;

if ( a = t[j] )

if ( ( a = t[j] ) != 0 )

red_by_vect(md,t+j,pivot+j,md-a,col-j);

}

l--;

Line 1977 int indep_rows_mod(int **mat0,int row,int col,int md,i

Line 2106 int indep_rows_mod(int **mat0,int row,int col,int md,i

}

for ( i = rank+1; i < row; i++ ) {

t = mat[i];

if ( a = t[j] )

if ( ( a = t[j] ) != 0 )

red_by_vect(md,t+j,pivot+j,md-a,col-j);

}

rank++;

Line 2011 int generic_gauss_elim_sf(int **mat0,int row,int col,i

Line 2140 int generic_gauss_elim_sf(int **mat0,int row,int col,i

*pk = _mulsf(*pk,inv);

for ( i = rank+1; i < row; i++ ) {

t = mat[i];

if ( a = t[j] )

if ( ( a = t[j] ) != 0 )

red_by_vect_sf(md,t+j,pivot+j,_chsgnsf(a),col-j);

}

rank++;

Line 2021 int generic_gauss_elim_sf(int **mat0,int row,int col,i

Line 2150 int generic_gauss_elim_sf(int **mat0,int row,int col,i

pivot = mat[l];

for ( i = 0; i < l; i++ ) {

t = mat[i];

if ( a = t[j] )

if ( ( a = t[j] ) != 0 )

red_by_vect_sf(md,t+j,pivot+j,_chsgnsf(a),col-j);

}

l--;

Line 2057 int lu_gfmmat(GFMMAT mat,unsigned int md,int *perm)

Line 2186 int lu_gfmmat(GFMMAT mat,unsigned int md,int *perm)

pivot[k] = inv = invm(pivot[k],md);

for ( i = k+1; i < row; i++ ) {

t = a[i];

if ( m = t[k] ) {

if ( ( m = t[k] ) != 0 ) {

DMAR(inv,m,0,md,t[k])

for ( j = k+1, m = md - t[k]; j < col; j++ )

if ( pivot[j] ) {

Line 2113 int find_lhs_and_lu_mod(unsigned int **a,int row,int c

Line 2242 int find_lhs_and_lu_mod(unsigned int **a,int row,int c

pivot[k] = inv = invm(pivot[k],md);

for ( i = d+1; i < row; i++ ) {

t = a[i];

if ( m = t[k] ) {

if ( ( m = t[k] ) != 0 ) {

DMAR(inv,m,0,md,t[k])

for ( j = k+1, m = md - t[k]; j < col; j++ )

if ( pivot[j] ) {

Line 2148 int lu_mod(unsigned int **a,int n,unsigned int md,int

Line 2277 int lu_mod(unsigned int **a,int n,unsigned int md,int

inv = invm(pivot[k],md);

for ( i = k+1; i < n; i++ ) {

t = a[i];

if ( m = t[k] ) {

if ( ( m = t[k] ) != 0 ) {

DMAR(inv,m,0,md,t[k])

for ( j = k+1, m = md - t[k]; j < n; j++ )

if ( pivot[j] ) {

Line 2177 void solve_by_lu_mod(int **a,int n,int md,int **b,int

Line 2306 void solve_by_lu_mod(int **a,int n,int md,int **b,int

int i,j,k;

unsigned int t,m,m2;

y = (int *)MALLOC_ATOMIC(n*sizeof(int));

y = (unsigned int *)MALLOC_ATOMIC(n*sizeof(int));

c = (int *)MALLOC_ATOMIC(n*sizeof(int));

c = (unsigned int *)MALLOC_ATOMIC(n*sizeof(int));

m2 = md>>1;

for ( k = 0; k < l; k++ ) {

/* copy b[.][k] to c */

Line 2338 int gauss_elim_geninv_mod(unsigned int **mat,int row,i

Line 2467 int gauss_elim_geninv_mod(unsigned int **mat,int row,i

pivot[k] = dmar(pivot[k],inv,0,md);

for ( i = j+1; i < row; i++ ) {

t = mat[i];

if ( a = t[j] )

if ( ( a = t[j] ) != 0 )

for ( k = j, a = md - a; k < m; k++ )

t[k] = dmar(pivot[k],a,t[k],md);

}

Line 2347 int gauss_elim_geninv_mod(unsigned int **mat,int row,i

Line 2476 int gauss_elim_geninv_mod(unsigned int **mat,int row,i

pivot = mat[j];

for ( i = j-1; i >= 0; i-- ) {

t = mat[i];

if ( a = t[j] )

if ( ( a = t[j] ) != 0 )

for ( k = j, a = md - a; k < m; k++ )

t[k] = dmar(pivot[k],a,t[k],md);

}

Line 2565 int gauss_elim_geninv_mod_swap(unsigned int **mat,int

Line 2694 int gauss_elim_geninv_mod_swap(unsigned int **mat,int

pivot[k] = (unsigned int)dmar(pivot[k],inv,0,md);

for ( i = j+1; i < row; i++ ) {

t = mat[i];

if ( a = t[j] )

if ( ( a = t[j] ) != 0 )

for ( k = j, a = md - a; k < m; k++ )

if ( pivot[k] )

t[k] = dmar(pivot[k],a,t[k],md);

Line 2575 int gauss_elim_geninv_mod_swap(unsigned int **mat,int

Line 2704 int gauss_elim_geninv_mod_swap(unsigned int **mat,int

pivot = mat[j];

for ( i = j-1; i >= 0; i-- ) {

t = mat[i];

if ( a = t[j] )

if ( ( a = t[j] ) != 0 )

for ( k = j, a = md - a; k < m; k++ )

if ( pivot[k] )

t[k] = dmar(pivot[k],a,t[k],md);

Line 2611 void Pgeninv_sf_swap(NODE arg,LIST *rp)

Line 2740 void Pgeninv_sf_swap(NODE arg,LIST *rp)

for ( i = 0; i < row; i++ ) {

bzero((char *)wmat[i],(col+row)*sizeof(int));

for ( j = 0; j < col; j++ )

if ( q = (GFS)mat[i][j] )

if ( ( q = (GFS)mat[i][j] ) != 0 )

wmat[i][j] = FTOIF(CONT(q));

wmat[i][col+i] = _onesf();

}

Line 2622 void Pgeninv_sf_swap(NODE arg,LIST *rp)

Line 2751 void Pgeninv_sf_swap(NODE arg,LIST *rp)

MKMAT(mat1,col,col);

for ( i = 0, tmat = (GFS **)mat1->body; i < col; i++ )

for ( j = 0; j < col; j++ )

if ( t = invmat[i][j] ) {

if ( ( t = invmat[i][j] ) != 0 ) {

MKGFS(IFTOF(t),tmat[i][j]);

}

MKVECT(vect1,row);

Line 2659 int gauss_elim_geninv_sf_swap(int **mat,int row,int co

Line 2788 int gauss_elim_geninv_sf_swap(int **mat,int row,int co

pivot[k] = _mulsf(pivot[k],inv);

for ( i = j+1; i < row; i++ ) {

t = mat[i];

if ( a = t[j] )

if ( ( a = t[j] ) != 0 )

for ( k = j, a = _chsgnsf(a); k < m; k++ )

if ( pivot[k] ) {

u = _mulsf(pivot[k],a);

Line 2671 int gauss_elim_geninv_sf_swap(int **mat,int row,int co

Line 2800 int gauss_elim_geninv_sf_swap(int **mat,int row,int co

pivot = mat[j];

for ( i = j-1; i >= 0; i-- ) {

t = mat[i];

if ( a = t[j] )

if ( ( a = t[j] ) != 0 )

for ( k = j, a = _chsgnsf(a); k < m; k++ )

if ( pivot[k] ) {

u = _mulsf(pivot[k],a);

Line 2844 int generate_ONB_polynomial(UP2 *rp,int m,int type)

Line 2973 int generate_ONB_polynomial(UP2 *rp,int m,int type)

for ( i = 0; i < w; i++ )

f->b[i] = 0xffffffff;

/* mask the top word if necessary */

if ( r = (m+1)&31 )

if ( ( r = (m+1)&31 ) != 0 )

f->b[w-1] &= (1<<r)-1;

return 0;

break;

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