Changing and unchanging 2-rainbow independent domination

Abstract

For a function f : V(G ) → \0, 1, 2\ we denote by Vi the set of vertices to which the value i is assigned by f, i.e. Vi = \ x ∈ V (G ) : f(x ) = i \. If a function f: V(G) → \0,1,2\ satisfying the condition that Vi is independent for i ∈ \1,2\ and every vertex u for which f(u) = 0 is adjacent to at least one vertex v for which f(v) = i for each i ∈ \1,2\, then f is called a 2-rainbow independent dominating function (2RiDF). The weight w(f) of a 2RiDF f is the value w(f) = |V1|+|V2|. The minimum weight of a 2RiDF on a graph G is called the 2-rainbow independent domination number of G. A graph G is 2-rainbow independent domination stable if the 2-rainbow independent domination number of G remains unchanged under removal of any vertex. In this paper, we characterize 2-rainbow independent domination stable trees and we study the effect of edge removal on 2-rainbow independent domination number in trees.