Revisiting $k$-tuple dominating sets with emphasis on small values of $k$

Abstract: For any graph G of order n with degree sequence d 1 ≥ • • • ≥ d n , we define the double Slater number sℓ ×2 (G) as the smallest integer t such that t + d 1 + • • • + d t−e ≥ 2n − p in which e and p are the number of end-vertices and penultimate vertices of G, respectively. We show that γ ×2 (G) ≥ sℓ ×2 (G), where γ ×2 (G) is the well-known double domination number of a graph G with no isolated vertices. We prove that the problem of deciding whether the equality holds for a given graph is NP-complete even when… Show more