MINIMUM CONVEX COVER OF SPECIAL NON ORIENTED GRAPHS
Date
2016
Authors
Journal Title
Journal ISSN
Volume Title
Publisher
CEP USM
Abstract
A vertex set S of a graph G is convex if all vertices of every shortest path between two of its vertices are in S. We say that G has a convex p-cover if X (G)can be overed by p convex sets. The convex cover number of G Is the least p 2 for which G has a convex p-cover.In particular, the nontrivial convex cover number of G is the least p 2 for which G has a convex p-cover, where every set contains at least 3 elements.
In this paper we determine convex cover number and nontrivial convex cover number of special graphs resulting from some operations.
We examine graphs resulting from join of graphs, Cartesian product
of graphs, lexicographic product of graphs and corona of graphs.
Description
Keywords
nonoriented graphs, convex covers, convex number, operations, joins, cartesian product, corona, grafuri neorientate, acoperiri convexe, numărul acoperirii convexe, suma grafurilor
Citation
BUZATU, Radu. Minimum convex cover of special non oriented graphs. In: Studia Universitatis Moldaviae. Seria Științe exacte și economice: Matematică. Informatică. Fizică. Economie. Revistă științifică. 2016, nr. 2 (92), pp. 46-54.