Long induced paths and forbidden patterns: Polylogarithmic bounds
Abstract
Consider a graph G with a long path P. When is it the case that G also contains a long induced path? This question has been investigated in general as well as within a number of different graph classes since the 80s. We have recently observed in a companion paper (Long induced paths in sparse graphs and graphs with forbidden patterns, arXiv:2411.08685, 2024) that most existing results can recovered in a simple way by considering forbidden ordered patterns of edges along the path P. In particular we proved that if we forbid some fixed ordered matching along a path of order n in a graph G, then G must contain an induced path of order ( n)(1). Moreover, we completely characterized the forbidden ordered patterns forcing the existence of an induced path of polynomial size. The purpose of the present paper is to completely characterize the ordered patterns H such that forbidding H along a path P of order n implies the existence of an induced path of order ( n)(1). These patterns are star forests with some specific ordering, which we called constellations. As a direct consequence of our result, we show that if a graph G has a path of length n and does not contain Kt as a topological minor, then G contains an induced path of order ( n)(1/t 2 t). The previously best known bound was ( n)f(t) for some unspecified function f depending on the Topological Minor Structure Theorem of Grohe and Marx (2015).
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