On the Signed (Total) k-Domination Number of a Graph

Abstract

Let k be a positive integer and G=(V,E) be a graph of minimum degree at least k-1. A function f:V→ \-1,1\ is called a signed k-dominating function of G if Σu∈ NG[v]f(u)≥ k for all v∈ V. The signed k-domination number of G is the minimum value of Σv∈ Vf(v) taken over all signed k-dominating functions of G. The signed total k-dominating function and signed total k-domination number of G can be similarly defined by changing the closed neighborhood NG[v] to the open neighborhood NG(v) in the definition. The upper signed k-domination number is the maximum value of Σv∈ Vf(v) taken over all minimal signed k-dominating functions of G. In this paper, we study these graph parameters from both algorithmic complexity and graph-theoretic perspectives. We prove that for every fixed k≥ 1, the problems of computing these three parameters are all -hard. We also present sharp lower bounds on the signed k-domination number and signed total k-domination number for general graphs in terms of their minimum and maximum degrees, generalizing several known results about signed domination.