In this paper we show that a $k$-shellable simplicial complex is the expansion of a shellable complex. We prove that the face ring of a pure $k$-shellable simplicial complex satisfies the Stanley conjecture. In this way, by applying an expansion functor to the face ring of a given pure shellable complex, we construct a large class of rings satisfying the Stanley conjecture.Also, by presenting some characterizations of $k$-shellable graphs, we extend some results due to Castrillón-Cruz, Cruz-Estrada and Van Tuyl-Villareal
Chain complexes are studied here as an abstract algebraic generalisation of geometric simplicial com...
We prove that for every d ≥ 2, deciding if a pure, d-dimensional, simplicial complex is shellable is...
AbstractIn this short note we discuss the shellability of (nonpure) simplicial complexes in terms of...
AbstractAssociated to a simple undirected graph G is a simplicial complex ΔG whose faces correspond ...
Shellability of simplicial complexes has been a useful concept in polyhedral theory, in piecewise li...
A simplicial complex ∆ is shellable if its facets “fit nicely together”. Specifically, if there is a...
Abstract. Let G be a simple undirected graph and let ∆G be a simplicial complex whose faces correspo...
A famous conjecture by R. Stanley relates the depth of a module, an algebraic invariant, with the so...
AbstractThe vertex stars of shellable polytopal complexes are shown to be shellable. The link of a v...
We say that a pure $d$-dimensional simplicial complex $\Delta$ on $n$ vertices is shelling completab...
AbstractShellability of simplicial complexes has been a powerful concept in polyhedral theory, in p....
For a positive integer k a class of simplicial complexes, to be denoted by CM(k), is introduced. Thi...
The concept of shellability of complexes is generalized by deleting the requirement of purity (i.e.,...
AbstractWe give new examples of shellable, but not extendably shellable two-dimensional simplicial c...
AbstractWe show that for allk⩾1 andn⩾0 the simplicial complexes T(k)nof all leaf-labelled trees with...
Chain complexes are studied here as an abstract algebraic generalisation of geometric simplicial com...
We prove that for every d ≥ 2, deciding if a pure, d-dimensional, simplicial complex is shellable is...
AbstractIn this short note we discuss the shellability of (nonpure) simplicial complexes in terms of...
AbstractAssociated to a simple undirected graph G is a simplicial complex ΔG whose faces correspond ...
Shellability of simplicial complexes has been a useful concept in polyhedral theory, in piecewise li...
A simplicial complex ∆ is shellable if its facets “fit nicely together”. Specifically, if there is a...
Abstract. Let G be a simple undirected graph and let ∆G be a simplicial complex whose faces correspo...
A famous conjecture by R. Stanley relates the depth of a module, an algebraic invariant, with the so...
AbstractThe vertex stars of shellable polytopal complexes are shown to be shellable. The link of a v...
We say that a pure $d$-dimensional simplicial complex $\Delta$ on $n$ vertices is shelling completab...
AbstractShellability of simplicial complexes has been a powerful concept in polyhedral theory, in p....
For a positive integer k a class of simplicial complexes, to be denoted by CM(k), is introduced. Thi...
The concept of shellability of complexes is generalized by deleting the requirement of purity (i.e.,...
AbstractWe give new examples of shellable, but not extendably shellable two-dimensional simplicial c...
AbstractWe show that for allk⩾1 andn⩾0 the simplicial complexes T(k)nof all leaf-labelled trees with...
Chain complexes are studied here as an abstract algebraic generalisation of geometric simplicial com...
We prove that for every d ≥ 2, deciding if a pure, d-dimensional, simplicial complex is shellable is...
AbstractIn this short note we discuss the shellability of (nonpure) simplicial complexes in terms of...