Acyclic orientations with degree constraints

Abstract

In this note we study the complexity of some generalizations of the notion of st-numbering. Suppose that given some functions f and g, we want to order the vertices of a graph such that every vertex v is preceded by at least f(v) of its neighbors and succeeded by at least g(v) of its neighbors. We prove that this problem is solvable in polynomial time if fg 0, but it becomes NP-complete for f g 2. This answers a question of the first author posed in 2009.