We present a simple example of a regular CW complex which is not shellable (in a sense defined by Björner) but whose barycentric subdivision is shellable. Its poset of faces is shellable but not lexicographically shellable
AbstractWe introduce and study a new class of shellings of simplicial complexes that we call h-shell...
In this thesis, I will discuss the relations and differences between EL-shellable and CL-shellable p...
AbstractShellability has been extensively studied by many researchers since McMullen solved the Uppe...
We present a simple example of a regular CW complex which is not shellable (in a sense defined by Bj...
The concept of shellability of complexes is generalized by deleting the requirement of purity (i.e.,...
AbstractIn this short note we discuss the shellability of (nonpure) simplicial complexes in terms of...
Shellability of simplicial complexes has been a useful concept in polyhedral theory, in piecewise li...
AbstractIt is shown that any finite, rank-connected, dismantlable lattice is lexicographically shell...
We prove that for every d ≥ 2, deciding if a pure, d-dimensional, simplicial complex is shellable is...
AbstractWe show that if a three-dimensional polytopal complex has a knot in its 1-skeleton, where th...
A simplicial complex ∆ is shellable if its facets “fit nicely together”. Specifically, if there is a...
AbstractThe vertex stars of shellable polytopal complexes are shown to be shellable. The link of a v...
AbstractWe give new examples of shellable, but not extendably shellable two-dimensional simplicial c...
AbstractFor a property P of simplicial complexes, a simplicial complex Γ is an obstruction to P if Γ...
All dissections of a convex (mn + 2)-gons into (m + 2)-gons arefacets of a simplicial complex. This ...
AbstractWe introduce and study a new class of shellings of simplicial complexes that we call h-shell...
In this thesis, I will discuss the relations and differences between EL-shellable and CL-shellable p...
AbstractShellability has been extensively studied by many researchers since McMullen solved the Uppe...
We present a simple example of a regular CW complex which is not shellable (in a sense defined by Bj...
The concept of shellability of complexes is generalized by deleting the requirement of purity (i.e.,...
AbstractIn this short note we discuss the shellability of (nonpure) simplicial complexes in terms of...
Shellability of simplicial complexes has been a useful concept in polyhedral theory, in piecewise li...
AbstractIt is shown that any finite, rank-connected, dismantlable lattice is lexicographically shell...
We prove that for every d ≥ 2, deciding if a pure, d-dimensional, simplicial complex is shellable is...
AbstractWe show that if a three-dimensional polytopal complex has a knot in its 1-skeleton, where th...
A simplicial complex ∆ is shellable if its facets “fit nicely together”. Specifically, if there is a...
AbstractThe vertex stars of shellable polytopal complexes are shown to be shellable. The link of a v...
AbstractWe give new examples of shellable, but not extendably shellable two-dimensional simplicial c...
AbstractFor a property P of simplicial complexes, a simplicial complex Γ is an obstruction to P if Γ...
All dissections of a convex (mn + 2)-gons into (m + 2)-gons arefacets of a simplicial complex. This ...
AbstractWe introduce and study a new class of shellings of simplicial complexes that we call h-shell...
In this thesis, I will discuss the relations and differences between EL-shellable and CL-shellable p...
AbstractShellability has been extensively studied by many researchers since McMullen solved the Uppe...
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