<?xml version="1.0" encoding="utf-8" ?> <!-- for emacs: -*- coding: utf-8 -*- --> <!-- Apache may like this line in the file .htaccess: AddCharset utf-8 .html --> <!DOCTYPE html PUBLIC "-//W3C//DTD XHTML 1.1 plus MathML 2.0 plus SVG 1.1//EN" "http://www.w3.org/2002/04/xhtml-math-svg/xhtml-math-svg-flat.dtd" > <html xmlns="http://www.w3.org/1999/xhtml" xml:lang="en"> <head><title>SymmetricPolynomials : Table of Contents</title> <link rel="stylesheet" type="text/css" href="../../../../Macaulay2/Style/doc.css"/> </head> <body><div><a href="index.html">top</a> | <a href="master.html">index</a> | <a href="http://www.math.uiuc.edu/Macaulay2/">Macaulay2 web site</a></div> <hr/> <h1>SymmetricPolynomials : Table of Contents</h1> <ul><li><span><span><a href="index.html" title="the algebra of symmetric polynomials">SymmetricPolynomials</a> -- the algebra of symmetric polynomials</span></span></li> <li><span><span><a href="_build__Symmetric__G__B.html" title="Groebner basis of elementary symmetric polynomials algebra">buildSymmetricGB</a> -- Groebner basis of elementary symmetric polynomials algebra</span></span></li> <li><span><span><a href="_build__Symmetric__G__B_lp__Polynomial__Ring_rp.html" title="Groebner basis of elementary symmetric polynomials algebra">buildSymmetricGB(PolynomialRing)</a> -- Groebner basis of elementary symmetric polynomials algebra</span></span></li> <li><span><span><a href="_elementary__Symmetric.html" title="expression in terms of elementary symmetric polynomials">elementarySymmetric</a> -- expression in terms of elementary symmetric polynomials</span></span></li> <li><span><span><a href="_elementary__Symmetric_lp__Polynomial__Ring_rp.html" title="elementary symmetric polynomials algebra">elementarySymmetric(PolynomialRing)</a> -- elementary symmetric polynomials algebra</span></span></li> <li><span><span><a href="_elementary__Symmetric_lp__Ring__Element_rp.html" title="expression in terms of elementary symmetric polynomials">elementarySymmetric(RingElement)</a> -- expression in terms of elementary symmetric polynomials</span></span></li> </ul> </body> </html>