Complexity results on locally-balanced 2-partitions of graphs

Abstract

A 2-partition of a graph G is a function f:V(G)→ \0,1\. A 2-partition f of a graph G is a locally-balanced with an open neighborhood if for every v∈ V(G), \u∈ NG(v)\,f(u)=0\ - \u∈ NG(v)\,f(u)=1\ ≤ 1. A 2-partition f of a graph G is a locally-balanced with a closed neighborhood if for every v∈ V(G), \u∈ NG[v]\,f(u)=0\ - \u∈ NG[v]\,f(u)=1\ ≤ 1. In this paper we prove that the problem of the existence of locally-balanced 2-partition with an open (closed) neighborhood is NP-complete for some restricted classes of graphs. In particular, we show that the problem of deciding if a given graph has a locally-balanced 2-partition with an open neighborhood is NP-complete for biregular bipartite graphs and even bipartite graphs with maximum degree 4, and the problem of deciding if a given graph has a locally-balanced 2-partition with a closed neighborhood is NP-complete even for subcubic bipartite graphs and odd graphs with maximum degree 3. Last results prove a conjecture of Balikyan and Kamalian.