Infinite Tur\'an problems for bipartite graphs

Abstract

We consider an infinite version of the bipartite Tur\'an problem. Let G be an infinite graph with V(G) = N and let Gn be the n-vertex subgraph of G induced by the vertices \1,2, …, n \. We show that if G is K2,t+1-free then for infinitely many n, e(Gn) ≤ 0.471 t n3/2. Using the K2,t+1-free graphs constructed by F\"uredi, we construct an infinite K2,t+1-free graph with e(Gn) ≥ 0.23 tn3/2 for all n ≥ n0.