A linear-time algorithm for finding a complete graph minor in a dense graph

Abstract

Let g(t) be the minimum number such that every graph G with average degree d(G) ≥ g(t) contains a Kt-minor. Such a function is known to exist, as originally shown by Mader. Kostochka and Thomason independently proved that g(t) ∈ (t*sqrtlog t). This article shows that for all fixed ε > 0 and fixed sufficiently large t ≥ t(ε), if d(G) ≥ (2+ε)g(t) then we can find this Kt-minor in linear time. This improves a previous result by Reed and Wood who gave a linear-time algorithm when d(G) ≥ 2t-2.