Cliques in Squares of Graphs with Maximum Average Degree less than 4

Abstract

Hocquard, Kim, and Pierron constructed, for every even integer D 2, a 2-degenerate graph GD with maximum degree D such that ω(GD2)=52D. We prove for (a) all 2-degenerate graphs G and (b) all graphs G with mad(G)<4, upper bounds on the clique number ω(G2) of G2 that match the lower bound given by this construction, up to small additive constants. We show that if G is 2-degenerate with maximum degree D, then ω(G2) 52D+72 (with ω(G2) 52D+60 when D is sufficiently large). And if G has mad(G)<4 and maximum degree D, then ω(G2) 52D+532. Thus, the construction of Hocquard et al. is essentially best possible. Our proofs introduce a "token passing" technique to derive crucial information about non-adjacencies in G of vertices that are adjacent in G2. This is a powerful technique for working with such graphs that has not previously appeared in the literature.