A Polynomial Time Algorithm for Computing the Strong Rainbow Connection Numbers of Odd Cacti
Combinatorics
2019-12-30 v1 Computational Complexity
Discrete Mathematics
Abstract
We consider the problem of computing the strong rainbow connection number for cactus graphs in which all cycles have odd length. We present a formula to calculate for such odd cacti which can be evaluated in linear time, as well as an algorithm for computing the corresponding optimal strong rainbow edge coloring, with polynomial worst case run time complexity. Although computing is NP-hard in general, previous work has demonstrated that it may be computed in polynomial time for certain classes of graphs, including cycles, trees and block clique graphs. This work extends the class of graphs for which may be computed in polynomial time.
Cite
@article{arxiv.1912.11906,
title = {A Polynomial Time Algorithm for Computing the Strong Rainbow Connection Numbers of Odd Cacti},
author = {Logan A. Smith and David T. Mildebrath and Illya V. Hicks},
journal= {arXiv preprint arXiv:1912.11906},
year = {2019}
}
Comments
18 pages, 4 figures