Planar 3-dimensional assignment problems with Monge-like cost arrays

Abstract

Given an n× n× p cost array C we consider the problem p-P3AP which consists in finding p pairwise disjoint permutations 1,2,…,p of \1,…,n\ such that Σk=1pΣi=1ncik(i)k is minimized. For the case p=n the planar 3-dimensional assignment problem P3AP results. Our main result concerns the p-P3AP on cost arrays C that are layered Monge arrays. In a layered Monge array all n× n matrices that result from fixing the third index k are Monge matrices. We prove that the p-P3AP and the P3AP remain NP-hard for layered Monge arrays. Furthermore, we show that in the layered Monge case there always exists an optimal solution of the p-3PAP which can be represented as matrix with bandwidth 4p-3. This structural result allows us to provide a dynamic programming algorithm that solves the p-P3AP in polynomial time on layered Monge arrays when p is fixed.