On the NP-Hardness of Approximating Ordering Constraint Satisfaction Problems

Abstract

We show improved NP-hardness of approximating Ordering Constraint Satisfaction Problems (OCSPs). For the two most well-studied OCSPs, Maximum Acyclic Subgraph and Maximum Betweenness, we prove inapproximability of 14/15+ε and 1/2+ε. An OCSP is said to be approximation resistant if it is hard to approximate better than taking a uniformly random ordering. We prove that the Maximum Non-Betweenness Problem is approximation resistant and that there are width-m approximation-resistant OCSPs accepting only a fraction 1 / (m/2)! of assignments. These results provide the first examples of approximation-resistant OCSPs subject only to P ≠ .