Bipartite spanning sub(di)graphs induced by 2-partitions

Abstract

For a given 2-partition (V1,V2) of the vertices of a (di)graph G, we study properties of the spanning bipartite subdigraph BG(V1,V2) of G induced by those arcs/edges that have one end in each Vi. We determine, for all pairs of non-negative integers k1,k2, the complexity of deciding whether G has a 2-partition (V1,V2) such that each vertex in Vi has at least ki (out-)neighbours in V3-i. We prove that it is NP-complete to decide whether a digraph D has a 2-partition (V1,V2) such that each vertex in V1 has an out-neighbour in V2 and each vertex in V2 has an in-neighbour in V1. The problem becomes polynomially solvable if we require D to be strongly connected. We give a characterisation, based on the so-called strong component digraph of a non-strong digraph of the structure of NP-complete instances in terms of their strong component digraph. When we want higher in-degree or out-degree to/from the other set the problem becomes NP-complete even for strong digraphs. A further result is that it is NP-complete to decide whether a given digraph D has a 2-partition (V1,V2) such that BD(V1,V2) is strongly connected. This holds even if we require the input to be a highly connected eulerian digraph.