Bipartite independence number in graphs with bounded maximum degree

Abstract

We consider a natural, yet seemingly not much studied, extremal problem in bipartite graphs. A bi-hole of size t in a bipartite graph G is a copy of Kt, t in the bipartite complement of G. Let f(n, ) be the largest k for which every n × n bipartite graph with maximum degree in one of the parts has a bi-hole of size k. Determining f(n, ) is thus the bipartite analogue of finding the largest independent set in graphs with a given number of vertices and bounded maximum degree. Our main result determines the asymptotic behavior of f(n, ). More precisely, we show that for large but fixed and n sufficiently large, f(n, ) = ( n). We further address more specific regimes of , especially when is a small fixed constant. In particular, we determine f(n, 2) exactly and obtain bounds for f(n, 3), though determining the precise value of f(n, 3) is still open.