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<h1>SimplicialComplexes : Table of Contents</h1>
<ul><li><span><span><a href="index.html" title="simplicial complexes">SimplicialComplexes</a> -- simplicial complexes</span></span></li>
<li><span><span><a href="_boundary.html" title="boundary operator">boundary</a> -- boundary operator</span></span></li>
<li><span><span><a href="_boundary_lp__Simplicial__Complex_rp.html" title="the boundary simplicial complex of D">boundary(SimplicialComplex)</a> -- the boundary simplicial complex of D</span></span></li>
<li><span><span><a href="_boundary_lp__Z__Z_cm__Simplicial__Complex_rp.html" title="the boundary map from i-faces to (i-1)-faces">boundary(ZZ,SimplicialComplex)</a> -- the boundary map from i-faces to (i-1)-faces</span></span></li>
<li><span><span><a href="_buchberger__Complex.html" title="Buchberger complex of a monomial ideal">buchbergerComplex</a> -- Buchberger complex of a monomial ideal</span></span></li>
<li><span><span><a href="_coefficient__Ring_lp__Simplicial__Complex_rp.html" title="get the coefficient ring">coefficientRing(SimplicialComplex)</a> -- get the coefficient ring</span></span></li>
<li><span><span><a href="_dim_lp__Simplicial__Complex_rp.html" title="dimension of a simplicial complex">dim(SimplicialComplex)</a> -- dimension of a simplicial complex</span></span></li>
<li><span><span><a href="_dual_lp__Simplicial__Complex_rp.html" title="the Alexander dual of a simplicial complex">dual(SimplicialComplex)</a> -- the Alexander dual of a simplicial complex</span></span></li>
<li><span><span><a href="_faces.html" title="the i-faces of a simplicial complex ">faces</a> -- the i-faces of a simplicial complex </span></span></li>
<li><span><span><a href="_facets.html" title="the facets of a simplicial complex">facets</a> -- the facets of a simplicial complex</span></span></li>
<li><span><span><a href="_f__Vector.html" title="the f-vector of a simplicial complex">fVector</a> -- the f-vector of a simplicial complex</span></span></li>
<li><span><span><a href="_ideal_lp__Simplicial__Complex_rp.html" title="the ideal of minimal nonfaces (the Stanley-Reisner ideal)">ideal(SimplicialComplex)</a> -- the ideal of minimal nonfaces (the Stanley-Reisner ideal)</span></span></li>
<li><span><span><a href="_is__Pure.html" title="whether the facets are equidimensional">isPure</a> -- whether the facets are equidimensional</span></span></li>
<li><span><span><a href="_label.html" title="labels with monomials the faces of simplicial complex">label</a> -- labels with monomials the faces of simplicial complex</span></span></li>
<li><span><span><a href="_link.html" title="link of a face in a simplicial complex">link</a> -- link of a face in a simplicial complex</span></span></li>
<li><span><span><a href="_lyubeznik__Complex.html" title="Simplicial complex supporting the Lyubeznik resolution of a  monomial ideal">lyubeznikComplex</a> -- Simplicial complex supporting the Lyubeznik resolution of a  monomial ideal</span></span></li>
<li><span><span><a href="_monomial__Ideal_lp__Simplicial__Complex_rp.html" title="the monomial ideal of minimal nonfaces (the Stanley-Reisner ideal)">monomialIdeal(SimplicialComplex)</a> -- the monomial ideal of minimal nonfaces (the Stanley-Reisner ideal)</span></span></li>
<li><span><span><a href="_ring_lp__Simplicial__Complex_rp.html" title="get the associated ring of an object">ring(SimplicialComplex)</a> -- get the associated ring of an object</span></span></li>
<li><span><span><tt>simplicialChainComplex</tt> (missing documentation<!-- tag: simplicialChainComplex -->)</span></span></li>
<li><span><span><a href="___Simplicial__Complex.html" title="">SimplicialComplex</a></span></span></li>
<li><span><span><a href="_simplicial__Complex.html" title="create a simplicial complex">simplicialComplex</a> -- create a simplicial complex</span></span></li>
<li><span><span><a href="_superficial__Complex.html" title="Simplicial complex supporting a superficial resolution of a monomial ideal">superficialComplex</a> -- Simplicial complex supporting a superficial resolution of a monomial ideal</span></span></li>
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