Valid inequalities and complete characterizations of the 2-domination and P3-hull number polytope
Metadata
Show full item recordAuthor/s:
Marenco, Javier
Blaum, Manuela
Date:
2023Abstract
Given a graph G = (V;E), a subset S V is 2-dominating if every vertex in S
has at least two neighbors in S. The minimum cardinality of such a set is called
the 2-domination number of G. Consider a process in discrete time that, starting
with an initial set of marked vertices S, at each step marks all unmarked vertices
having two marked neighbors. In such a process, the minimum number of initial
vertices in S such that eventually all vertices are marked is called the P3-hull
number of G. In this work, we explore a polyhedral relation between these two
parameters and, in addition, we provide new families of valid inequalities for
the associated polytopes. Finally, we give explicit descriptions of the polytopes
associated to these problems when G is a path, a cycle, a complete graph, or a
tree.