Algorithm on rainbow connection for maximal outerplanar graphs
Abstract
In this paper, we consider rainbow connection number of maximal outerplanar graphs(MOPs) on algorithmic aspect. For the (MOP) , we give sufficient conditions to guarantee that Moreover, we produce the graph with given diameter and give their rainbow coloring in linear time. X.Deng et al. give a polynomial time algorithm to compute the rainbow connection number of MOPs by the Maximal fan partition method, but only obtain a compact upper bound. J. Lauri proved that, for chordal outerplanar graphs given an edge-coloring, to verify whether it is rainbow connected is NP-complete under the coloring, it is so for MOPs. Therefore we construct Central-cut-spine of MOP by which we design an algorithm to give a rainbow edge coloring with at most colors in polynomial time.
Keywords
Cite
@article{arxiv.1605.01857,
title = {Algorithm on rainbow connection for maximal outerplanar graphs},
author = {Xingchao Deng and Hengzhe Li and Guiying Yan},
journal= {arXiv preprint arXiv:1605.01857},
year = {2016}
}
Comments
14 pages,13 figures