On a complete characterization of path-free complexes associated with complete multipartite graphs

Abstract

Let G be a graph and let t(G) denote the simplicial complex whose faces are vertex subsets whose induced subgraphs contain no path on t vertices. These complexes encode a forbidden-subgraph condition as a family of allowed vertex subsets. In this paper, we study t-path-free complexes of complete multipartite graphs. Let \[ G=Kn1,…,nm, n1·s nm. \] We first obtain an explicit structural decomposition of t(G) as a union of join complexes, together with an additional lower-dimensional size-truncation term. Using this decomposition, we show that for t 2nm-1-2 the complex t(G) is not sequentially Cohen-Macaulay, while for t 2 nm-1-1 it is vertex decomposable. Consequently, we obtain a complete characterization for complete multipartite graphs: t(G) is vertex decomposable if and only if t 2nm-1-1. Equivalently, this is also exactly the range in which t(G) is shellable and sequentially Cohen-Macaulay. We further analyze the topology via a Mayer-Vietoris spectral sequence: for complete bipartite graphs, we determine the full homotopy type as an explicit wedge of spheres in all cases.

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