On the generalized Turán number of complete bipartite graphs
Abstract
For graphs F and H, the generalized Turán number ex(n,F,H) denotes the maximum number of copies of F in an H-free graph on n vertices. We prove that if s∈ \2,3\, s< a≤ b and t is sufficiently large, then ex(n,Ka,b,Ks,t)=Θ(ns). The s=2, a=b=3 case of this result answers a question of Spiro. Proving another conjecture of Spiro, we show that for every graph F with at least one edge, there exist infinitely many real numbers r such that ex(n,F,H)=Θ(nr) holds for some graph H.
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