An Induced A-Path Theorem

Abstract

Given a graph G and A⊂eq V(G), a classical theorem of Gallai (1964) states that for every positive integer k, the graph G contains k pairwise vertex-disjoint A-paths, or a set Z⊂eq V(G) of size at most 2(k-1) such that G-Z contains no A-paths. We generalise Gallai's theorem to the induced setting: We prove that G contains k pairwise anti-complete A-paths, or a set Z of size at most 78(k-1) such that, after removing the closed neighbourhood of Z, the resulting graph has no A-path. Here, two paths are anti-complete if they are vertex disjoint and there is no edge in G having one endpoint in each of them. We further show that the bound 78(k-1) on the size of Z can be reduced to 4(k-1) if one removes the balls of radius 4 around the vertices of Z (instead of radius 1), which is within a factor 2 of optimal. We also establish analogous results for long induced A-paths.

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