AbstractFor a property P of simplicial complexes, a simplicial complex Γ is an obstruction to P if Γ itself does not satisfy P but all of its proper restrictions satisfy P. In this paper, we determine all obstructions to shellability of dimension ⩽2, refining the previous work by Wachs. As a consequence we obtain that the set of obstructions to shellability, that to partitionability and that to sequential Cohen–Macaulayness all coincide for dimensions ⩽2. We also show that these three sets of obstructions coincide in the class of flag complexes. These results show that the three properties, hereditary-shellability, hereditary-partitionability, and hereditary-sequential Cohen–Macaulayness are equivalent for these classes
International audienceA long-standing conjecture of Stanley states that every Cohen–Macaulay simplic...
AbstractThere is currently no efficient algorithm for deciding whether a given simplicial complex is...
We say that a pure $d$-dimensional simplicial complex $\Delta$ on $n$ vertices is shelling completab...
AbstractFor a property P of simplicial complexes, a simplicial complex Γ is an obstruction to P if Γ...
A simplicial complex ∆ is shellable if its facets “fit nicely together”. Specifically, if there is a...
We prove that for every d >= 2, deciding if a pure, d-dimensional, simplicial complex is shellable i...
A long-standing conjecture of Stanley states that every Cohen–Macaulay simplicial complex is partiti...
This is the authors' accepted manuscript. First published in Notices of the American Mathematical So...
We prove that for every d ≥ 2, deciding if a pure, d-dimensional, simplicial complex is shellable is...
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...
AbstractShellability of simplicial complexes has been a powerful concept in polyhedral theory, in p....
AbstractIn this short note we discuss the shellability of (nonpure) simplicial complexes in terms of...
We present a simple example of a regular CW complex which is not shellable (in a sense defined by Bj...
AbstractWe give new examples of shellable, but not extendably shellable two-dimensional simplicial c...
International audienceA long-standing conjecture of Stanley states that every Cohen–Macaulay simplic...
AbstractThere is currently no efficient algorithm for deciding whether a given simplicial complex is...
We say that a pure $d$-dimensional simplicial complex $\Delta$ on $n$ vertices is shelling completab...
AbstractFor a property P of simplicial complexes, a simplicial complex Γ is an obstruction to P if Γ...
A simplicial complex ∆ is shellable if its facets “fit nicely together”. Specifically, if there is a...
We prove that for every d >= 2, deciding if a pure, d-dimensional, simplicial complex is shellable i...
A long-standing conjecture of Stanley states that every Cohen–Macaulay simplicial complex is partiti...
This is the authors' accepted manuscript. First published in Notices of the American Mathematical So...
We prove that for every d ≥ 2, deciding if a pure, d-dimensional, simplicial complex is shellable is...
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...
AbstractShellability of simplicial complexes has been a powerful concept in polyhedral theory, in p....
AbstractIn this short note we discuss the shellability of (nonpure) simplicial complexes in terms of...
We present a simple example of a regular CW complex which is not shellable (in a sense defined by Bj...
AbstractWe give new examples of shellable, but not extendably shellable two-dimensional simplicial c...
International audienceA long-standing conjecture of Stanley states that every Cohen–Macaulay simplic...
AbstractThere is currently no efficient algorithm for deciding whether a given simplicial complex is...
We say that a pure $d$-dimensional simplicial complex $\Delta$ on $n$ vertices is shelling completab...