Graph pattern detection: Hardness for all induced patterns and faster non-induced cycles

Abstract

We consider the pattern detection problem in graphs: given a constant size pattern graph H and a host graph G, determine whether G contains a subgraph isomorphic to H. Our main results are: * We prove that if a pattern H contains a k-clique subgraph, then detecting whether an n node host graph contains a not necessarily induced copy of H requires at least the time for detecting whether an n node graph contains a k-clique. The previous result of this nature required that H contains a k-clique which is disjoint from all other k-cliques of H. * We show that if the famous Hadwiger conjecture from graph theory is true, then detecting whether an n node host graph contains a not necessarily induced copy of a pattern with chromatic number t requires at least the time for detecting whether an n node graph contains a t-clique. This implies that: (1) under Hadwiger's conjecture for every k-node pattern H, finding an induced copy of H requires at least the time of k-clique detection, and at least size ω(nk/4) for any constant depth circuit, and (2) unconditionally, detecting an induced copy of a random G(k,p) pattern w.h.p. requires at least the time of (k/ k)-clique detection, and hence also at least size n(k/ k) for circuits of constant depth. * Finally, we consider the case when the pattern is a directed cycle on k nodes, and we would like to detect whether a directed m-edge graph G contains a k-Cycle as a not necessarily induced subgraph. We resolve a 14 year old conjecture of [Yuster-Zwick SODA'04] on the complexity of k-Cycle detection by giving a tight analysis of their k-Cycle algorithm. Our analysis improves the best bounds for k-Cycle detection in directed graphs, for all k>5.