Tree Containment Above Minimum Degree is FPT

Abstract

According to the classic Chv\'atal's Lemma from 1977, a graph of minimum degree δ(G) contains every tree on δ(G)+1 vertices. Our main result is the following algorithmic "extension" of Chv\'atal's Lemma: For any n-vertex graph G, integer k, and a tree T on at most δ(G)+k vertices, deciding whether G contains a subgraph isomorphic to T, can be done in time f(k)· nO(1) for some function f of k only. The proof of our main result is based on an interplay between extremal graph theory and parameterized algorithms.

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