Local Hadwiger's Conjecture

Abstract

We propose local versions of Hadwiger's Conjecture, where only balls of radius ((v(G))) around each vertex are required to be Kt-minor-free. We ask: if a graph is locally-Kt-minor-free, is it t-colourable? We show that the answer is yes when t ≤ 5, even in the stronger setting of list-colouring, and we complement this result with a O( v(G))-round distributed colouring algorithm in the LOCAL model. Further, we show that for large enough values of t, we can list-colour locally-Kt-minor-free graphs with 13· \h(t), 312(t-1) \)colours, where h(t) is any value such that all Kt-minor-free graphs are h(t)-list-colourable. We again complement this with a O( v(G))-round distributed algorithm.