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γ-total dominating graphs of paths and cycles

Alongkot Wongsriya^a, Nantapath Trakultraipruk^b,*

 
ABSTRACT:     A total dominating set for a graph G=(V(G),E(G)) is a subset D of V(G) such that every vertex in V(G) is adjacent to some vertex in D. The total domination number of G, denoted by γ_t(G), is the minimum cardinality of a total dominating set of G. A total dominating set of cardinality γ_t(G) is called a γ-total dominating set. Let TD_γ be the set of all γ-total dominating sets in G. We define the γ-total dominating graph of G, denoted by TD_γ(G), to be the graph whose vertex set is TD_γ, and two γ-total dominating sets D₁ and D₂ from TD_γ are adjacent in TD_γ(G) if D₁=D₂∖{u}∪{v} for some u∈D₂ and v∉D₂. In this paper, we present γ-total dominating graphs of paths and cycles.

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* Corresponding author, E-mail: n.trakultraipruk@yahoo.com

Received 28 Sep 2016, Accepted 16 Nov 2017