An Improved Nordhaus–Gaddum-Type Theorem for 2-Rainbow Independent Domination Number

For a graph G , its k -rainbow independent domination number, written as γ rik ( G ) , is defined as the cardinality of a minimum set consisting of k vertex-disjoint independent sets V 1 , V 2 , … , V k such that every vertex in V 0 = V ( G ) \ ( ∪ i = 1 k V i ) has a neighbor in V i for all i ∈ { 1 , 2 , … , k } . This domination invariant was proposed by Kraner Šumenjak, Rall and Tepeh (in Applied Mathematics and Computation 333(15), 2018: 353–361), which aims to compute the independent domination number of G □ K k (the generalized prism) via studying the problem of integer labeling on G . They proved a Nordhaus–Gaddum-type theorem: 5 ≤ γ ri 2 ( G ) + γ ri 2 ( G ¯ ) ≤ n + 3 for any n -order graph G with n ≥ 3 , in which G ¯ denotes the complement of G . This work improves their result and shows that if G ≇ C 5 , then 5 ≤ γ ri 2 ( G ) + γ ri 2 ( G ¯ ) ≤ n + 2 .