Shellability in Clique-Free Complexes of Graphs
Abstract
We study combinatorial and algebraic properties of -clique-free complexes, a family of simplicial complexes associated with finite simple graphs that generalize the classical independence complex. For a graph and an integer , the -clique-free complex is the simplicial complex on the vertex set of whose faces are the subsets inducing no cliques of size . Our main results provide sufficient conditions for shellability and related decomposability properties of -clique-free complexes. In particular, we show that if is a -diamond-free chordal graph (in particular, a block graph), then is -decomposable and hence shellable. We also investigate how graph modifications via clique attachments influence shellability. Generalizing earlier constructions involving whiskers and clique extensions, we introduce the following operation: given a graph , a subset , and an integer , we form a graph by attaching to each vertex in a clique of size at least . We prove that is shellable if and only if is shellable. This yields a flexible method for constructing shellable complexes, particularly when is a cycle cover. In addition, we extend the notion of clique whiskering and show that for any graph admitting a clique vertex-partition, the resulting -clique whiskering produces a pure and shellable, and hence Cohen-Macaulay, -clique-free complex. Finally, we establish a Fr\"oberg-type result linking chordality and linear resolutions. We show that for any chordal graph , the edge ideal of the complement -clique clutter admits a -linear resolution over any field.
Cite
@article{arxiv.2602.09623,
title = {Shellability in Clique-Free Complexes of Graphs},
author = {Rakesh Ghosh and S Selvaraja},
journal= {arXiv preprint arXiv:2602.09623},
year = {2026}
}
Comments
18 pages. Comments are welcome