Nearly tight bounds for induced subdivisions

Abstract

Subdivisions of complete graphs play a central role in combinatorics, having deep connections to structural, extremal, and topological aspects of graph theory. A celebrated conjecture of Mader, proved independently by Bollobás and Thomason and by Komlós and Szemerédi, states that every graph of average degree of order h2 contains a subdivision of Kh. In this paper, we consider the induced variant of this problem. A theorem of Kühn and Osthus implies that, for every fixed graph H and every s 1, graphs of sufficiently large average degree contain either a copy of Ks,s or an induced subdivision of H. However, even for H=Kh, the best previous quantitative bounds were far from optimal. We prove nearly tight bounds for forcing induced subdivisions of Kh. We show that every Ks,t-free graph of average degree Ωs,t(h2(s-1)7(s-1) h) contains an induced subdivision of Kh, and that every C2k-free graph with k ≥ 3 and average degree Ωk(h5 h) contains an induced subdivision of Kh. These bounds substantially improve the previously known results and are nearly optimal in both settings. They also hold if Kh is replaced by any other graph on h vertices.

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