Uniform Length Dominating Sequence Graphs
Abstract
A sequence of vertices (v1,\, … , \,vk) of a graph G is called a dominating closed neighborhood sequence if \v1,\, … , \,vk\ is a dominating set of G and N[vi] j=1i-1 N[vj] for every i. A graph G is said to be k-uniform if all dominating closed neighborhood sequences have equal length k. Bre sar et al. (2014) characterized k-uniform graphs with k≤ 3. In this article we extend their work by giving a complete characterization of all k-uniform graphs with k≥ 4.
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