Max-Cut in Degenerate H-Free Graphs

Abstract

We obtain several lower bounds on the Max-Cut of d-degenerate H-free graphs. Let f(m,d,H) denote the smallest Max-Cut of an H-free d-degenerate graph on m edges. We show that f(m,d,Kr) (12 + d-1+(r-1))m, generalizing a recent work of Carlson, Kolla, and Trevisan. We also give bounds on f(m,d,H) when H is a cycle, odd wheel, or a complete bipartite graph with at most 4 vertices on one side. We also show stronger bounds on f(m,d,Kr) assuming a conjecture of Alon, Bollabas, Krivelevich, and Sudakov (2003). We conjecture that f(m,d,Kr)= ( 12 + r(d-1/2) )m for every r 3, and show that this conjecture implies the ABKS conjecture.