The k-th Roman domination problem is polynomial on interval graphs
P Li - Journal of Combinatorial Optimization, 2024 - Springer
P Li
Journal of Combinatorial Optimization, 2024•SpringerLet G be some simple graph and k be any positive integer. Take h: V (G)→{0, 1,…, k+ 1} and
v∈ V (G), let AN h (v) denote the set of vertices w∈ NG (v) with h (w)≥ 1. Let AN h [v]= AN h
(v)∪{v}. The function h is a [k]-Roman dominating function of G if h (AN h [v])≥| AN h (v)|+ k
holds for any v∈ V (G). The minimum weight of such a function is called the k-th Roman
Domination number of G, which is denoted by γ kR (G). In 2020, Banerjee et al. presented
linear time algorithms to compute the double Roman domination number on proper interval …
v∈ V (G), let AN h (v) denote the set of vertices w∈ NG (v) with h (w)≥ 1. Let AN h [v]= AN h
(v)∪{v}. The function h is a [k]-Roman dominating function of G if h (AN h [v])≥| AN h (v)|+ k
holds for any v∈ V (G). The minimum weight of such a function is called the k-th Roman
Domination number of G, which is denoted by γ kR (G). In 2020, Banerjee et al. presented
linear time algorithms to compute the double Roman domination number on proper interval …
Abstract
Let G be some simple graph and k be any positive integer. Take and , let denote the set of vertices with . Let . The function h is a [k]-Roman dominating function of G if holds for any . The minimum weight of such a function is called the k-th Roman Domination number of G, which is denoted by . In 2020, Banerjee et al. presented linear time algorithms to compute the double Roman domination number on proper interval graphs and block graphs. They posed the open question that whether there is some polynomial time algorithm to solve the double Roman domination problem on interval graphs. It is argued that the interval graph is a nontrivial graph class. In this article, we design a simple dynamic polynomial time algorithm to solve the k-th Roman domination problem on interval graphs for each fixed integer .
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