Balanced subdivisions of cliques in graphs

Abstract

Given a graph H, a balanced subdivision of H is a graph obtained from H by subdividing every edge the same number of times. In 1984, Thomassen conjectured that for each integer k 1, high average degree is sufficient to guarantee a balanced subdivision of Kk. Recently, Liu and Montgomery resolved this conjecture. We give an optimal estimate up to an absolute constant factor by showing that there exists c>0 such that for sufficiently large d, every graph with average degree at least d contains a balanced subdivision of a clique with at least cd1/2 vertices. It also confirms a conjecture from Verstra\"ete: every graph of average degree cd2, for some absolute constant c>0, contains a pair of disjoint isomorphic subdivisions of the complete graph Kd. We also prove that there exists some absolute c>0 such that for sufficiently large d, every C4-free graph with average degree at least d contains a balanced subdivision of the complete graph Kcd, which extends a result of Balogh, Liu and Sharifzadeh.