Note about the complexity of the acyclic orientation with parity constraint problem

Abstract

Let G = (V, E) be a connected graph, and let T in V be a subset of vertices. An orientation of G is called T-odd if any vertex v ∈ V has odd in-degree if and only if it is in T. Finding a T -odd orientation of G can be solved in polynomial time as shown by Chevalier, Jaeger, Payan and Xuong (1983). Since then, T-odd orientations have continued to attract interest, particularly in the context of global constraints on the orientation. For instance, Frank and Kir\'aly (2002) investigated k-connected T-odd orientations and raised questions about acyclic T-odd orientations. This problem is now recognized as an Egres problem and is known as the "Acyclic orientation with parity constraints" problem. Szegedy ( 005) proposed a randomized polynomial algorithm to address this problem. An easy consequence of his work provides a polynomial time algorithm for planar graphs whenever |T | = |V | - 1. Nevertheless, it remains unknown whether it exists in general. In this paper we contribute to the understanding of the complexity of this problem by studying a more general one. We prove that finding a T-odd acyclic orientation on graphs having some directed edges is NP-complete.

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