Partitioning digraphs with outdegree at least 4

Abstract

Scott asked the question of determining cd such that if D is a digraph with m arcs and minimum outdegree d 2 then V(D) has a partition V1, V2 such that \e(V1,V2),e(V2, V1)\≥ cdm, where e(V1,V2) (respectively, e(V2,V1)) is the number of arcs from V1 to V2 (respectively, from V2 to V1). Lee, Loh, and Sudakov showed that c2=1/6+o(1) and c3=1/5+o(1), and conjectured that cd= d-12(2d-1)+o(1) for d 4. In this paper, we show c4=3/14+o(1) and prove some partial results for d 5.