Vertex decomposable complexes of directed forests, conflict graphs and chordality

Abstract

Let D be a multidigraph. We study the simplicial complex Dlf(D), whose vertices are the directed edges of D and whose faces correspond to directed linear forests, that is, vertex-disjoint unions of directed paths. We also consider the related directed tree complex DT(D). Our main approach is to associate with D a simple graph encoding the local incompatibilities among the edges of D. Under mild acyclicity assumptions, we show that Dlf(D) and DT(D) can be realized as the independence complexes of respective graphs. This correspondence allows us to apply structural results from the theory of independence complexes to obtain graph-theoretic criteria guaranteeing vertex decomposability, shellability, and sequential Cohen-Macaulayness of these complexes. In particular, we describe explicit forbidden induced directed subgraphs that obstruct vertex decomposability, and we identify classes of multidigraphs-including certain acyclic multidigraphs and multidigraphs whose underlying graphs are forests or cycles-for which Dlf(D) and DT(D) are vertex decomposable. We also provide examples showing that these properties do not hold in general.