Minimum 0-Extension Problems on Directed Metrics
Abstract
For a metric on a finite set , the minimum 0-extension problem 0-Ext is defined as follows: Given and , minimize subject to , where the sum is taken over all unordered pairs in . This problem generalizes several classical combinatorial optimization problems such as the minimum cut problem or the multiterminal cut problem. Karzanov and Hirai established a complete classification of metrics for which 0-Ext is polynomial time solvable or NP-hard. This result can also be viewed as a sharpening of the general dichotomy theorem for finite-valued CSPs (Thapper and \v{Z}ivn\'{y} 2016) specialized to 0-Ext. In this paper, we consider a directed version -Ext of the minimum 0-extension problem, where and are not assumed to be symmetric. We extend the NP-hardness condition of 0-Ext to -Ext: If cannot be represented as the shortest path metric of an orientable modular graph with an orbit-invariant ``directed'' edge-length, then -Ext is NP-hard. We also show a partial converse: If is a directed metric of a modular lattice with an orbit-invariant directed edge-length, then -Ext is tractable. We further provide a new NP-hardness condition characteristic of -Ext, and establish a dichotomy for the case where is a directed metric of a star.
Cite
@article{arxiv.2006.00153,
title = {Minimum 0-Extension Problems on Directed Metrics},
author = {Hiroshi Hirai and Ryuhei Mizutani},
journal= {arXiv preprint arXiv:2006.00153},
year = {2024}
}