Double domination and total 2-domination in digraphs and their dual problems

Abstract

A subset S of vertices of a digraph D is a double dominating set (total 2-dominating set) if every vertex not in S is adjacent from at least two vertices in S, and every vertex in S is adjacent from at least one vertex in S (the subdigraph induced by S has no isolated vertices). The double domination number (total 2-domination number) of a digraph D is the minimum cardinality of a double dominating set (total 2-dominating set) in D. In this work, we investigate these concepts which can be considered as two extensions of double domination in graphs to digraphs, along with the concepts 2-limited packing and total 2-limited packing which have close relationships with the above-mentioned concepts.