Authors | Massoud Aman,Nasim Nasrabadi |
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Journal | Asia-Pacific Journal of Operational Research |
Page number | 1-20 |
IF | 0.303 |
Paper Type | Full Paper |
Journal Grade | ISI |
Journal Type | Typographic |
Journal Country | Iran, Islamic Republic Of |
Journal Index | JCR،Scopus |
Abstract
Given a network G = (N, A, c) and an s − t cut [S, ¯ S] with the capacity β and the constant value α, an inverse minimum s − t cut problem with value constraint is to modify the vector capacity c as little as possible to make the s − t cut [S, ¯ S] become a minimum s−t cut with the capacity α. The distinctive feature of this problem with the inverse minimum cut problems is the addition of a constraint in which the capacity of the given cut has to equal to the preassumed value α. In this article, we investigate the inverse minimum s−t cut problem with value constraint under the bottleneck weighted Hamming distance. We propose two strongly polynomial time algorithms based on a binary search to solve the problem. At each iteration of the first one, we solve a feasible flow problem. The second algorithm considers the problem in two cases β > α and β < α. In this algorithm, we first modify the capacity vector such that the given cut becomes a minimum s − t cut in the network and then, by preserving optimality this s − t cut, adjust it to satisfy value constraint.
tags: Inverse problem; Bottleneck-type Hamming distance; Binary search; Strongly polynomial time algorithm