Return to mat CVS log

Up to [local] / OpenXM_contrib2 / asir2000 / lib

Imported asir2000 as OpenXM_contrib2/asir2000.

/* $OpenXM: OpenXM_contrib2/asir2000/lib/mat,v 1.1.1.1 1999/12/03 07:39:11 noro Exp $ */
/* fraction free gaussian elimination; detructive */

def deter(MAT)
{
	S = size(MAT);
	if ( car(S) != car(cdr(S)) )
		return 0;
	N = car(S);
	for ( J = 0, D = 1; J < N; J++ ) {
		for ( I = J; (I<N)&&(MAT[I][J] == 0); I++ );
		if ( I != N ) {
			for ( L = I; L < N; L++ )
				if ( MAT[L][J] && (nmono(MAT[L][J]) < nmono(MAT[I][J])) )
					I = L;
			if ( J != I )
				for ( K = 0; K < N; K++ ) {
					B = MAT[J][K]; MAT[J][K] = MAT[I][K]; MAT[I][K] = B;
				}

			for ( I = J + 1, V = MAT[J][J]; I < N; I++ )
				for ( K = J + 1, U = MAT[I][J]; K < N; K++ )
					MAT[I][K] = sdiv(MAT[I][K]*V-MAT[J][K]*U,D);
			D = V;
		} else
			return ( 0 );
	}
	return (D);
}

/* characteristic polynomial */

def cp(M)
{
	tstart;
	S = size(M);
	if ( car(S) != car(cdr(S)) )
		return 0;
	N = car(S);
	MAT = newmat(N,N);
	for ( I = 0; I < N; I++ )
		for ( J = 0; J < N; J++ )
			if ( I == J ) 
				MAT[I][J] = red(M[I][J]-x);
			else
				MAT[I][J] = red(M[I][J]);
	D = deter(MAT);
	tstop;
	return (D);
}

/* calculation of charpoly by danilevskii's method */

def da(MAT)
{
	tstart;
	S = size(MAT);
	if ( car(S) != car(cdr(S)) )
		return 0;
	N = car(S);
	M = newmat(N,N);
	for ( I = 0; I < N; I++ )
		for ( J = 0; J < N; J++ )
			M[I][J] = red(MAT[I][J]);

	for ( W = newvect(N), J = 0, K = 0, D = 1; J < N; J++ ) {
		for ( I = J + 1; (I<N) && (M[I][J] == 0); I++ );
		if ( I == N ) {
			for ( L = J, S = 1; L >= K; L-- )
				S = S*x-M[L][J];
			D *= S;
			K = J + 1;
		} else {
			B = J + 1;
			for ( L = 0; L < N; L++ ) {
				T = M[I][L]; M[I][L] = M[B][L]; M[B][L] = T;
			}
			for ( L = 0; L < N; L++ ) {
				T = M[L][B]; M[L][B] = M[L][I]; M[L][I] = T;
				W[L] = M[L][J];
			}
			for ( L = K, T = red(1/M[B][J]); L < N; L++ )
				M[B][L] *= T;
			for ( L = K; L < N; L++ )
				if ( W[L] && (L != J + 1) )
					for ( B = K, T = W[L]; B < N; B++ )
						M[L][B] -= M[J+1][B]*T;
			for ( L = K; L < N; L++ ) {
				for ( B = 0, T = 0; B < N ; B++ )
					T += M[L][B] * W[B];
				M[L][J + 1] = T;
			}
		}
	}
	tstop;
	return ( D );
}

def newvmat(N) {
	M = newmat(N,N);
	for ( I = 0; I < N; I++ )
		for ( J = 0; J < N; J++ )
			M[I][J] = strtov(rtostr(x)+rtostr(I))^J;
	return M;
}

def newssmat(N) {
	M = newmat(N,N);
	for ( I = 0; I < N; I++ )
		for ( J = 0; J < N; J++ )
			M[I][J] = strtov(rtostr(x)+rtostr(I)+"_"+rtostr(J));
	return M;
}

def newasssmat(N) {
	N *= 2;
	M = newmat(N,N);
	for ( I = 0; I < N; I++ )
		for ( J = 0; J < I; J++ )
			M[I][J] = strtov(rtostr(x)+rtostr(I)+"_"+rtostr(J));
	for ( I = 0; I < N; I++ )
		for ( J = I + 1; J < N; J++ )
			M[I][J] = -M[J][I];
	return M;
}

/* calculation of determinant by minor expansion */

def edet(M) {
	S = size(M);
	if ( S[0] == 1 )
		return M[0][0];
	else {
		N = S[0];
		L = newmat(N-1,N-1);
		for ( I = 0, R = 0; I < N; I++ ) {
			for ( J = 1; J < N; J++ ) {
				for ( K = 0; K < I; K++ )
					L[J-1][K] = M[J][K];
				for ( K = I+1; K < N; K++ )
					L[J-1][K-1] = M[J][K];
			}
			R += (-1)^I*edet(L)*M[0][I];
		}
		return R;
	}
}

/* sylvester's matrix */

def syl(V,P1,P2) {
	D1 = deg(P1,V); D2 = deg(P2,V);
	M = newmat(D1+D2,D1+D2);
	for ( J = 0; J <= D2; J++ )
		M[0][J] = coef(P2,D2-J,V);
	for ( I = 1; I < D1; I++ )
		for ( J = 0; J <= D2; J++ )
		M[I][I+J] = M[0][J];
	for ( J = 0; J <= D1; J++ )
		M[D1][J] = coef(P1,D1-J,V);
	for ( I = 1; I < D2; I++ )
		for ( J = 0; J <= D1; J++ )
		M[D1+I][I+J] = M[D1][J];
	return M;
}

/* calculation of resultant by edet() */

def res_minor(V,P1,P2)
{
	D1 = deg(P1,V); D2 = deg(P2,V);
	M = newmat(D1+D2,D1+D2);
	for ( J = 0; J <= D2; J++ )
		M[0][J] = coef(P2,D2-J,V);
	for ( I = 1; I < D1; I++ )
		for ( J = 0; J <= D2; J++ )
		M[I][I+J] = M[0][J];
	for ( J = 0; J <= D1; J++ )
		M[D1][J] = coef(P1,D1-J,V);
	for ( I = 1; I < D2; I++ )
		for ( J = 0; J <= D1; J++ )
		M[D1+I][I+J] = M[D1][J];
	return edet(M);
}
end$