English

Robust Multicovers with Budgeted Uncertainty

Optimization and Control 2018-12-14 v2 Combinatorics

Abstract

The Min-qq-Multiset Multicover problem presented in this paper is a special version of the Multiset Multicover problem. For a fixed positive integer qq, we are given a finite ground set JJ, an integral demand for each element in JJ and a collection of subsets of JJ. The task is to choose sets of the collection (multiple choices are allowed) such that each element in JJ is covered at least as many times as specified by the demand of the element. In contrast to Multiset Multicover, in Min-qq-Multiset Multicover each of the chosen subsets may only cover up to qq of its elements with multiple choices being allowed. Our main focus is a robust version of Min-qq-Multiset Multicover, called Robust Min-qq-Multiset Multicover, in which the demand of each element in JJ may vary in a given interval with an additional budget constraint bounding the sum of the demands. Again, the task is to find a selection of subsets which is feasible for all admissible demands. We show that the non-robust version is NP-complete for qq greater than two, whereas the robust version is strongly NP-hard for any positive qq. Furthermore, we present two solution approaches based on constraint generation and investigate the corresponding separation problems. We present computational results using randomly generated instances as well as instances emerging from the problem of locating emergency doctors.

Cite

@article{arxiv.1812.04622,
  title  = {Robust Multicovers with Budgeted Uncertainty},
  author = {Sven O. Krumke and Eva Schmidt and Manuel Streicher},
  journal= {arXiv preprint arXiv:1812.04622},
  year   = {2018}
}
R2 v1 2026-06-23T06:39:25.854Z