The inverse $p$-maxian problem on trees with variable edge lengths
Abstract
We concern the problem of modifying the edge lengths of a tree in minimum total cost so that the prespecified vertices become the -maxian with respect to the new edge lengths. This problem is called the inverse -maxian problem on trees. \textbf{Gassner} proposed efficient combinatorial alogrithm to solve the the inverse 1-maxian problem on trees in 2008. For the problem with , we claim that the problem can be reduced to finitely many inverse -maxian problem. We then develop algorithms to solve the inverse -maxian problem for various objective functions. The problem under -norm can be formulated as a linear program and thus can be solved in polynomial time. Particularly, if the underlying tree is a star, then the problem can be solved in linear time. We also devised algorithms to solve the problems under Chebyshev norm and bottleneck Hamming distance, where is the number of vertices of the tree. Finally, the problem under weighted sum Hamming distance is -hard.
Cite
@article{arxiv.1504.02830,
title = {The inverse $p$-maxian problem on trees with variable edge lengths},
author = {Kien Trung Nguyen},
journal= {arXiv preprint arXiv:1504.02830},
year = {2015}
}
Comments
9 pages