From 40f36ba910959d73cf9b24fcf01f6ded35c4d873 Mon Sep 17 00:00:00 2001 From: Christian Bauer Date: Fri, 23 Mar 2001 17:46:44 +0000 Subject: [PATCH 1/1] simplify_indexed() recognizes linear combinations of matrices with numeric coefficients --- doc/tutorial/ginac.texi | 13 +++++-------- 1 file changed, 5 insertions(+), 8 deletions(-) diff --git a/doc/tutorial/ginac.texi b/doc/tutorial/ginac.texi index ce36a1b5..3bebde56 100644 --- a/doc/tutorial/ginac.texi +++ b/doc/tutorial/ginac.texi @@ -1724,18 +1724,15 @@ tensor). @subsection Linear algebra The @code{matrix} class can be used with indices to do some simple linear -algebra (sums and products of vectors and matrices, traces and scalar -products): +algebra (linear combinations and products of vectors and matrices, traces +and scalar products): @example @{ idx i(symbol("i"), 2), j(symbol("j"), 2); symbol x("x"), y("y"); - matrix A(2, 2), X(2, 1); - A.set(0, 0, 1); A.set(0, 1, 2); - A.set(1, 0, 3); A.set(1, 1, 4); - X.set(0, 0, x); X.set(1, 0, y); + matrix A(2, 2, lst(1, 2, 3, 4)), X(2, 1, lst(x, y)); cout << indexed(A, i, i) << endl; // -> 5 @@ -1744,9 +1741,9 @@ products): cout << e.simplify_indexed() << endl; // -> [[ [[2*y+x]], [[4*y+3*x]] ]].i - e = indexed(A, i, j) * indexed(X, i) + indexed(X, j); + e = indexed(A, i, j) * indexed(X, i) + indexed(X, j) * 2; cout << e.simplify_indexed() << endl; - // -> [[ [[3*y+2*x,5*y+2*x]] ]].j + // -> [[ [[3*y+3*x,6*y+2*x]] ]].j @} @end example -- 2.44.0