Logarithmically-small Minors and Topological Minors

Abstract

Mader proved that for every integer t there is a smallest real number c(t) such that any graph with average degree at least c(t) must contain a Kt-minor. Fiorini, Joret, Theis and Wood conjectured that any graph with n vertices and average degree at least c(t)+ε must contain a Kt-minor consisting of at most C(ε,t) n vertices. Shapira and Sudakov subsequently proved that such a graph contains a Kt-minor consisting of at most C(ε,t) n n vertices. Here we build on their method using graph expansion to remove the n factor and prove the conjecture. Mader also proved that for every integer t there is a smallest real number s(t) such that any graph with average degree larger than s(t) must contain a Kt-topological minor. We prove that, for sufficiently large t, graphs with average degree at least (1+ε)s(t) contain a Kt-topological minor consisting of at most C(ε,t) n vertices. Finally, we show that, for sufficiently large t, graphs with average degree at least (1+ε)c(t) contain either a Kt-minor consisting of at most C(ε,t) vertices or a Kt-topological minor consisting of at most C(ε,t) n vertices.