Paper Info
Title
Robust balanced optimization.
Abstract
An instance of a balanced optimization problem with vector costs consists of a ground set X, a cost-vector for every element of X, and a system of feasible subsets over X. The goal is to find a feasible subset that minimizes the so-called imbalance of values in every coordinate of the underlying vector costs. Balanced optimization problems with vector costs are equivalent to the robust optimization version of balanced optimization problems under the min-max criterion. We regard these problems as a family of optimization problems; one particular member of this family is the known balanced assignment problem. We investigate the complexity and approximability of robust balanced optimization problems in a fairly general setting. We identify a large family of problems that admit a 2-approximation in polynomial time, and we show that for many problems in this family this approximation factor 2 is best-possible (unless P = NP). We pay special attention to the balanced assignment problem with vector costs and show that this problem is NP-hard even in the highly restricted case of sum costs. We conclude by performing computational experiments for this problem.
Year
DOI
Venue
2018
10.1007/s13675-018-0093-y
EURO J. Computational Optimization
Keywords
DocType
Volume
Balanced optimization,Assignment problem,Computational complexity,Approximation,90C27
Journal
6
Issue
ISSN
Citations 
3
2192-4406
0
PageRank 
References 
Authors
0.34
16
3
Name
Order
Citations
PageRank
Annette M. C. Ficker121.70
Frits C. R. Spieksma259158.84
Gerhard Woeginger34176384.37