A necessary and sufficient condition for the existence of \p,p+1,q-1,q\-orientations in simple graphs

Abstract

Let G be a simple graph and let p and q be two integer-valued functions on V(G) with p< q in which for each v∈ V(G), q(v) 12dG(v) and p(v) 12 q(v)-2. In this note, we show that G has an orientation such that for each vertex v, d+G(v)∈\p(v),p(v)+1,q(v)-1,q(v)\ if and only if it has an orientation such that for each vertex v, p(v) d+G(v) q(v) where d+G(v) denotes the out-degree of v in G. From this result, we refine a result due to Addario-Berry, Dalal, and Reed (2008) in bipartite simple graphs on the existence of degree constrained factors.

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