Tight Bounds for Subgraph Isomorphism and Graph Homomorphism

Abstract

We prove that unless Exponential Time Hypothesis (ETH) fails, deciding if there is a homomorphism from graph G to graph H cannot be done in time |V(H)|o(|V(G)|). Combined with the reduction of Cygan, Pachocki, and Socaa, our result rules out (subject to ETH) a possibility of |V(G)|o(|V(G)|)-time algorithm deciding if graph H is a subgraph of G. For both problems our lower bounds asymptotically match the running time of brute-force algorithms trying all possible mappings of one graph into another. Thus, our work closes the gap in the known complexity of these fundamental problems.