English

Partial domination in supercubic graphs

Combinatorics 2023-06-01 v1

Abstract

For some α\alpha with 0<α10 < \alpha \le 1, a subset XX of vertices in a graph GG of order~nn is an α\alpha-partial dominating set of GG if the set XX dominates at least α×n\alpha \times n vertices in GG. The α\alpha-partial domination number pdα(G){\rm pd}_{\alpha}(G) of GG is the minimum cardinality of an α\alpha-partial dominating set of GG. In this paper partial domination of graphs with minimum degree at least 33 is studied. It is proved that if GG is a graph of order~nn and with δ(G)3\delta(G)\ge 3, then pd78(G)13n{\rm pd}_{\frac{7}{8}}(G) \le \frac{1}{3}n. If in addition n60n\ge 60, then pd910(G)13n{\rm pd}_{\frac{9}{10}}(G) \le \frac{1}{3}n, and if GG is a connected cubic graph of order n28n\ge 28, then pd1314(G)13n{\rm pd}_{\frac{13}{14}}(G) \le \frac{1}{3}n. Along the way it is shown that there are exactly four connected cubic graphs of order 1414 with domination number 55.

Keywords

Cite

@article{arxiv.2305.19820,
  title  = {Partial domination in supercubic graphs},
  author = {Csilla Bujtás andMichael A. Henning and Sandi Klavžar},
  journal= {arXiv preprint arXiv:2305.19820},
  year   = {2023}
}
R2 v1 2026-06-28T10:51:57.634Z