On the Tur\'an number of the blow-up of the hexagon
Abstract
The r-blowup of a graph F, denoted by F[r], is the graph obtained by replacing the vertices and edges of F with independent sets of size r and copies of Kr,r, respectively. For bipartite graphs F, very little is known about the order of magnitude of the Tur\'an number of F[r]. In this paper we prove that ex(n,C6[2])=O(n5/3) and, more generally, for any positive integer t, ex(n,θ3,t[2])=O(n5/3). This is tight when t is sufficiently large.
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