The path-missing and path-free complexes of a directed graph
Abstract
We study two simplicial complexes arising from a directed graph G = (V, E) with two chosen vertices s and t: the *path-free complex*, consisting of all subsets F ⊂eq E that contain no path from s to t, and the *path-missing complex*, its Alexander dual. Using discrete Morse theory, we prove that both complexes have well-behaved homotopy types -- either contractible or homotopy-equivalent to spheres.
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