k-Tuple_Total_Domination_in_Inflated_Graphs
Abstract
The inflated graph of a graph with vertices is obtained from by replacing every vertex of degree of by a clique, which is isomorph to the complete graph , and each edge of is replaced by an edge in such a way that , , and two different edges of are replaced by non-adjacent edges of . For integer , the -tuple total domination number of is the minimum cardinality of a -tuple total dominating set of , which is a set of vertices in such that every vertex of is adjacent to at least vertices in it. For existing this number, must the minimum degree of is at least . Here, we study the -tuple total domination number in inflated graphs when . First we prove that , and then we characterize graphs that the -tuple total domination number number of is or . Then we find bounds for this number in the inflated graph , when has a cut-edge or cut-vertex , in terms on the -tuple total domination number of the inflated graphs of the components of or -components of , respectively. Finally, we calculate this number in the inflated graphs that have obtained by some of the known graphs.
Cite
@article{arxiv.1105.2404,
title = {k-Tuple_Total_Domination_in_Inflated_Graphs},
author = {Adel P. Kazemi},
journal= {arXiv preprint arXiv:1105.2404},
year = {2018}
}