Longest Cycle above Erdos-Gallai Bound
Abstract
In 1959, Erdos and Gallai proved that every graph G with average vertex degree ad(G)≥ 2 contains a cycle of length at least ad(G). We provide an algorithm that for k≥ 0 in time 2O(k) nO(1) decides whether a 2-connected n-vertex graph G contains a cycle of length at least ad(G)+k. This resolves an open problem explicitly mentioned in several papers. The main ingredients of our algorithm are new graph-theoretical results interesting on their own.
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