Independent Double Roman Domination on Block Graphs

Abstract

Given a graph G=(V,E), f:V → \0,1,2 \ is the Italian dominating function of G if f satisfies Σu ∈ N(v)f(u) ≥ 2 when f(v)=0. Denote w(f)=Σv ∈ Vf(v) as the weight of f. Let Vi=\v:f(v)=i\,i=0,1,2, we call f the independent Italian dominating function if V1 V2 is an independent set. The independent Italian domination number of G is the minimum weight of independent Italian dominating function f, denoted by iI(G). We equivalently transform the independent domination problem of the connected block graph G to the induced independent domination problem of its block-cutpoint graph T, then a linear time algorithm is given to find iI(G) of any connected block graph G based on dynamic programming.