Planar 3-dimensional assignment problems with Monge-like cost arrays
Abstract
Given an cost array we consider the problem -P3AP which consists in finding pairwise disjoint permutations of such that is minimized. For the case the planar 3-dimensional assignment problem P3AP results. Our main result concerns the -P3AP on cost arrays that are layered Monge arrays. In a layered Monge array all matrices that result from fixing the third index are Monge matrices. We prove that the -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 -3PAP which can be represented as matrix with bandwidth . This structural result allows us to provide a dynamic programming algorithm that solves the -P3AP in polynomial time on layered Monge arrays when is fixed.
Keywords
Cite
@article{arxiv.1405.5210,
title = {Planar 3-dimensional assignment problems with Monge-like cost arrays},
author = {Ante Ćustić and Bettina Klinz and Gerhard J. Woeginger},
journal= {arXiv preprint arXiv:1405.5210},
year = {2014}
}
Comments
16 pages, appendix will follow in v2