Complexity aspects of the triangle path convexity
Discrete Mathematics
2015-03-03 v1
Abstract
A path is a {\em triangle path} (respectively, {\em monophonic path}) of if no edges exist joining vertices and of such that ; (respectively, ). A set of vertices is {\em convex} in the triangle path convexity (respectively, monophonic convexity) of if the vertices of every triangle path (respectively, monophonic path) joining two vertices of are in . The cardinality of a maximum proper convex set of is the {\em convexity number of } and the cardinality of a minimum set of vertices whose convex hull is is the {\em hull number of }. Our main results are polynomial time algorithms for determining the convexity number and the hull number of a graph in the triangle path convexity.
Cite
@article{arxiv.1503.00458,
title = {Complexity aspects of the triangle path convexity},
author = {Mitre C. Dourado and Rudini M. Sampaio},
journal= {arXiv preprint arXiv:1503.00458},
year = {2015}
}
Comments
Submitted to WG 2015