Extending Grundy domination to k-Grundy domination

Abstract

The Grundy domination number of a graph G = (V,E) is the length of the longest sequence of unique vertices S = (v1, …, vk) satisfying N[vi] j=1i-1N[vj] ≠ for each i ∈ [k]. Recently, a generalization of this concept called k-Grundy domination was introduced. In k-Grundy domination, a vertex v can be included in S if it has a neighbor u such that u appears in the closed neighborhood of fewer than k vertices of S. In this paper, we determine the k-Grundy domination number for some families of graphs, find degree-based bounds for the k-L-Grundy domination number, and define a relationship between the k-Z-Grundy domination number and the k-forcing number of a graph.

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