Splits with forbidden subgraphs

Abstract

In this note, we fix a graph H and ask into how many vertices can each vertex of a clique of size n can be "split" such that the resulting graph is H-free. Formally: A graph is an (n,k)-graph if its vertex sets is a pairwise disjoint union of n parts of size at most k each such that there is an edge between any two distinct parts. Let f(n,H) = \k ∈ N : there is an (n,k)-graph G such that H⊂eq G\ . Barbanera and Ueckerdt observed that f(n, H)=2 for any graph H that is not bipartite. If a graph H is bipartite and has a well-defined Tur\'an exponent, i.e., ex(n, H) = (nr) for some r, we show that (n2/r -1) = f(n, H) = O (n2/r-1 1/r n). We extend this result to all bipartite graphs for which an upper and a lower Tur\'an exponents do not differ by much. In addition, we prove that f(n, K2,t) =(n1/3) for any fixed t.