Finding cliques using few probes

Abstract

Consider algorithms with unbounded computation time that probe the entries of the adjacency matrix of an n vertex graph, and need to output a clique. We show that if the input graph is drawn at random from Gn,12 (and hence is likely to have a clique of size roughly 2 n), then for every δ < 2 and constant , there is an α < 2 (that may depend on δ and ) such that no algorithm that makes nδ probes in rounds is likely (over the choice of the random graph) to output a clique of size larger than α n.