Discussiones Mathematicae Graph Theory (Aug 2014)

Downhill Domination in Graphs

  • Haynes Teresa W.,
  • Hedetniemi Stephen T.,
  • Jamieson Jessie D.,
  • Jamieson William B.

DOI
https://doi.org/10.7151/dmgt.1760
Journal volume & issue
Vol. 34, no. 3
pp. 603 – 612

Abstract

Read online

A path π = (v1, v2, . . . , vk+1) in a graph G = (V,E) is a downhill path if for every i, 1 ≤ i ≤ k, deg(vi) ≥ deg(vi+1), where deg(vi) denotes the degree of vertex vi ∈ V. The downhill domination number equals the minimum cardinality of a set S ⊆ V having the property that every vertex v ∈ V lies on a downhill path originating from some vertex in S. We investigate downhill domination numbers of graphs and give upper bounds. In particular, we show that the downhill domination number of a graph is at most half its order, and that the downhill domination number of a tree is at most one third its order. We characterize the graphs obtaining each of these bounds

Keywords