Abstract A shelling of a graph, viewed as an abstract simplicial complex that is pure of dimension 1, is an ordering of its edges such that every edge is adjacent to some other edges appeared previously. In this paper, we focus on complete bipartite graphs and trees. For complete bipartite graphs, we obtain an exact formula for their shelling numbers. And for trees, we relate their shelling numbers to linear extensions of tree posets and bound shelling numbers using vertex degrees and diameter
In graph theory, trees are combinatorial objects usually defined as connected graphs without cycles....
AbstractWe introduce and study a new class of shellings of simplicial complexes that we call h-shell...
AbstractLempel, Even and Cederbaum proved the following result: Given any edge {st} in a biconnected...
AbstractAssociated to a simple undirected graph G is a simplicial complex ΔG whose faces correspond ...
Abstract. Let G be a simple undirected graph and let ∆G be a simplicial complex whose faces correspo...
AbstractWe show that for allk⩾1 andn⩾0 the simplicial complexes T(k)nof all leaf-labelled trees with...
Shellability of simplicial complexes has been a useful concept in polyhedral theory, in piecewise li...
AbstractIn their work on ‘Coxeter-like complexes’, Babson and Reiner introduced a simplicial complex...
A simplicial complex ∆ is shellable if its facets “fit nicely together”. Specifically, if there is a...
In this paper we show that a $k$-shellable simplicial complex is the expansion of a shellable comple...
Abstract. In their work on ‘Coxeter-like complexes’, Babson and Reiner introduced a simplicial compl...
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...
We say that a pure $d$-dimensional simplicial complex $\Delta$ on $n$ vertices is shelling completab...
AbstractWe construct a family of extremely simple bijections that yield Cayley's famous formula for ...
In graph theory, trees are combinatorial objects usually defined as connected graphs without cycles....
AbstractWe introduce and study a new class of shellings of simplicial complexes that we call h-shell...
AbstractLempel, Even and Cederbaum proved the following result: Given any edge {st} in a biconnected...
AbstractAssociated to a simple undirected graph G is a simplicial complex ΔG whose faces correspond ...
Abstract. Let G be a simple undirected graph and let ∆G be a simplicial complex whose faces correspo...
AbstractWe show that for allk⩾1 andn⩾0 the simplicial complexes T(k)nof all leaf-labelled trees with...
Shellability of simplicial complexes has been a useful concept in polyhedral theory, in piecewise li...
AbstractIn their work on ‘Coxeter-like complexes’, Babson and Reiner introduced a simplicial complex...
A simplicial complex ∆ is shellable if its facets “fit nicely together”. Specifically, if there is a...
In this paper we show that a $k$-shellable simplicial complex is the expansion of a shellable comple...
Abstract. In their work on ‘Coxeter-like complexes’, Babson and Reiner introduced a simplicial compl...
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...
We say that a pure $d$-dimensional simplicial complex $\Delta$ on $n$ vertices is shelling completab...
AbstractWe construct a family of extremely simple bijections that yield Cayley's famous formula for ...
In graph theory, trees are combinatorial objects usually defined as connected graphs without cycles....
AbstractWe introduce and study a new class of shellings of simplicial complexes that we call h-shell...
AbstractLempel, Even and Cederbaum proved the following result: Given any edge {st} in a biconnected...