A Variation of the Erdos-S\'os Conjecture in Bipartite Graphs

Abstract

The Erdos-S\'os Conjecture states that every graph with average degree more than k-2 contains all trees of order k as subgraphs. In this paper, we consider a variation of the above conjecture: studying the maximum size of an (n,m)-bipartite graph which does not contain all (k,l)-bipartite trees for given integers n m and k l. In particular, we determine that the maximum size of an (n,m)-bipartite graph which does not contain all (n,m)-bipartite trees as subgraphs (or all (k,2)-bipartite trees as subgraphs, respectively). Furthermore, all these extremal graphs are characterized.