Rational exponents for cliques

Abstract

Let ex(n,H,F) be the maximum number of copies of H in an n-vertex graph which contains no copy of a graph from F. Thinking of H and F as fixed, we study the asymptotics of ex(n,H,F) in n. We say that a rational number r is realizable for H if there exists a finite family F such that ex(n,H,F) = (nr). Using randomized algebraic constructions, Bukh and Conlon showed that every rational between 1 and 2 is realizable for K2. We generalize their result to show that every rational between 1 and t is realizable for Kt, for all t ≥ 2. We also determine the realizable rationals for stars and note the connection to a related Sidorenko-type supersaturation problem.