Tight bounds for divisible subdivisions

Abstract

Alon and Krivelevich proved that for every n-vertex subcubic graph H and every integer q 2 there exists a (smallest) integer f=f(H,q) such that every Kf-minor contains a subdivision of H in which the length of every subdivision-path is divisible by q. Improving their superexponential bound, we show that f(H,q) 212qn+8n+14q, which is optimal up to a constant multiplicative factor.