X-Git-Url: https://ruderich.org/simon/gitweb/?a=blobdiff_plain;f=maxima%2Fmaxima-init.mac;h=1dedac1ba79932fc63ab1222536bf25db42be6a6;hb=49506632f4ab98a5d379f1c99841fc1923387241;hp=438989f1e567c4262931af244ee9e017065cd7ac;hpb=29daa783d21800160e6b262b932f984e67556e9e;p=config%2Fdotfiles.git diff --git a/maxima/maxima-init.mac b/maxima/maxima-init.mac index 438989f..1dedac1 100644 --- a/maxima/maxima-init.mac +++ b/maxima/maxima-init.mac @@ -1,20 +1,46 @@ /* - * Maxima (computer algebra system) configuration file, maxima part. + * Maxima (computer algebra system) configuration file, Maxima part. * - * Also have a look at maxima/maxima-init.mac. + * Also have a look at maxima/maxima-init.lisp. + * + * Notes: + * + * Solve Ax = b, thanks to Florian. + * + * A : matrix([1,2,0],[0,2,3],[0,0,4])$ + * b : matrix([1],[3],[5])$ + * linsolve_by_lu(A,b); */ +/* + * Copyright (C) 2011-2012 Simon Ruderich + * + * This file is free software: you can redistribute it and/or modify + * it under the terms of the GNU General Public License as published by + * the Free Software Foundation, either version 3 of the License, or + * (at your option) any later version. + * + * This file is distributed in the hope that it will be useful, + * but WITHOUT ANY WARRANTY; without even the implied warranty of + * MERCHANTABILITY or FITNESS FOR A PARTICULAR PURPOSE. See the + * GNU General Public License for more details. + * + * You should have received a copy of the GNU General Public License + * along with this file. If not, see . + */ -/* PACKAGES */ -/* Provides maxi() and mini() (and more). */ -load (descriptive); +/* CUSTOM FUNCTIONS */ +/* Didn't find any euclid norm in Maxima, so here it is. */ +norm(x) := sqrt(transpose(x) . x); -/* CUSTOM FUNCTIONS */ +/* Maxima's mat_norm() can't calculate the 2-norm. Thanks to Wolfgang Lindner + * (http://www.ma.utexas.edu/pipermail/maxima/2007/006300.html) for an + * improved version. */ +mat_norm2(x) := sqrt(lmax(eigenvalues(transpose(conjugate(x)) . x)[1])); -/* Maxima's norm() can't calculate the 2-norm. Only works for non-complex - * matrices. */ -norm_2(x) := sqrt(maxi(eigenvalues(transpose(x) . x)[1])); +/* Shortcut to perform lu factorization. */ +lu(x) := block(x : lu_factor(x), get_lu_factors(x)); /* vim: ft=maxima */