On the Tur\'an number of the hypercube

Abstract

In 1964, Erdos proposed the problem of estimating the Tur\'an number of the d-dimensional hypercube Qd. Since Qd is a bipartite graph with maximum degree d, it follows from results of F\"uredi and Alon, Krivelevich, Sudakov that ex(n,Qd)=Od(n2-1/d). A recent general result of Sudakov and Tomon implies the slightly stronger bound ex(n,Qd)=o(n2-1/d). We obtain the first power-improvement for this old problem by showing that ex(n,Qd)=Od(n2-1d-1+1(d-1)2d-1). This answers a question of Liu. Moreover, our techniques give a power improvement for a larger class of graphs than cubes. We use a similar method to prove that any n-vertex, properly edge-coloured graph without a rainbow cycle has at most O(n( n)2) edges, improving the previous best bound of n( n)2+o(1) by Tomon. Furthermore, we show that any properly edge-coloured n-vertex graph with ω(n n) edges contains a cycle which is almost rainbow: that is, almost all edges in it have a unique colour. This latter result is tight.

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