@article{sumathi2014,
author = {Sumathi, P. and Alarmelumangai, G.},
title = {Locating Equitable Domination and Independence Subdivision Numbers of Graphs},
year = {2014},
month = {8},
volume = {9},
pages = {27--32},
journal = {Bulletin of Mathematical Sciences and Applications},
doi = {10.18052/www.scipress.com/BMSA.9.27},
keywords = {Independence, Locating Equitable Domination, Subdivision Numbers},
abstract = {Let G = (V,E) be a simple, undirected, finite nontrivial graph. A non empty set DV of vertices in a graph G is a dominating set if every vertex in V-D is adjacent to some vertex in D. The domination number (G) is the minimum cardinality of a dominating set of G. A dominating set D is a locating equitable dominating set of G if for any two vertices u,wєV-D, N(u)∩D ≠ N(w)∩D, |N(u)∩D| ≠ |N(w)∩D|. The locating equitable domination number of G is the minimum cardinality of a locating equitable dominating set of G. The locating equitable domination subdivision number of G is the minimum number of edges that must be subdivided (where each edge in G can be subdivided at most once) in order to increase the locating equitable domination number and is denoted by sd$\gamma$le(G). The independence subdivision number sd$\beta$le(G) to equal the minimum number of edges that must be subdivided in order to increase the independence number. In this paper, we establish bounds on sd$\gamma$le(G) and sd$\beta$le(G) for some families of graphs.}
}