On Minimum Maximal Distance-k Matchings
Abstract
We study the computational complexity of several problems connected with finding a maximal distance- matching of minimum cardinality or minimum weight in a given graph. We introduce the class of -equimatchable graphs which is an edge analogue of -equipackable graphs. We prove that the recognition of -equimatchable graphs is co-NP-complete for any fixed . We provide a simple characterization for the class of strongly chordal graphs with equal -packing and -domination numbers. We also prove that for any fixed integer the problem of finding a minimum weight maximal distance- matching and the problem of finding a minimum weight -independent dominating set cannot be approximated in polynomial time in chordal graphs within a factor of unless , where is a fixed constant (thereby improving the NP-hardness result of Chang for the independent domination case). Finally, we show the NP-hardness of the minimum maximal induced matching and independent dominating set problems in large-girth planar graphs. Note: This version (as compared to the journal submission) contains corrections to Section 4.
Cite
@article{arxiv.1602.04581,
title = {On Minimum Maximal Distance-k Matchings},
author = {Yury Kartynnik and Andrew Ryzhikov},
journal= {arXiv preprint arXiv:1602.04581},
year = {2024}
}
Comments
12 pages, 4 figures