English

Shellability in Clique-Free Complexes of Graphs

Combinatorics 2026-02-11 v1 Commutative Algebra

Abstract

We study combinatorial and algebraic properties of tt-clique-free complexes, a family of simplicial complexes associated with finite simple graphs that generalize the classical independence complex. For a graph GG and an integer t2t \ge 2, the tt-clique-free complex CFt(G)\mathsf{CF}_t(G) is the simplicial complex on the vertex set of GG whose faces are the subsets inducing no cliques of size tt. Our main results provide sufficient conditions for shellability and related decomposability properties of tt-clique-free complexes. In particular, we show that if GG is a tt-diamond-free chordal graph (in particular, a block graph), then CFt(G)\mathsf{CF}_t(G) is (t2)(t-2)-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 HH, a subset SV(H)S \subseteq V(H), and an integer t2t \ge 2, we form a graph Cl(H,S,t)\operatorname{Cl}(H,S,t) by attaching to each vertex in SS a clique of size at least tt. We prove that CFt(HS)\mathsf{CF}_t(H\setminus S) is shellable if and only if CFt(Cl(H,S,t))\mathsf{CF}_t(\operatorname{Cl}(H,S,t)) is shellable. This yields a flexible method for constructing shellable complexes, particularly when SS 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 tt-clique whiskering produces a pure and shellable, and hence Cohen-Macaulay, tt-clique-free complex. Finally, we establish a Fr\"oberg-type result linking chordality and linear resolutions. We show that for any chordal graph GG, the edge ideal of the complement tt-clique clutter CHt(G)\overline{\mathcal{CH}_t(G)} admits a tt-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

R2 v1 2026-07-01T10:29:28.890Z