English

Domination in Functigraphs

Combinatorics 2012-04-17 v1

Abstract

Let G1G_1 and G2G_2 be disjoint copies of a graph GG, and let f:V(G1)V(G2)f: V(G_1) \rightarrow V(G_2) be a function. Then a \emph{functigraph} C(G,f)=(V,E)C(G, f)=(V, E) has the vertex set V=V(G1)V(G2)V=V(G_1) \cup V(G_2) and the edge set E=E(G1)E(G2){uvuV(G1),vV(G2),v=f(u)}E=E(G_1) \cup E(G_2) \cup \{uv \mid u \in V(G_1), v \in V(G_2), v=f(u)\}. A functigraph is a generalization of a \emph{permutation graph} (also known as a \emph{generalized prism}) in the sense of Chartrand and Harary. In this paper, we study domination in functigraphs. Let γ(G)\gamma(G) denote the domination number of GG. It is readily seen that γ(G)γ(C(G,f))2γ(G)\gamma(G) \le \gamma(C(G,f)) \le 2 \gamma(G). We investigate for graphs generally, and for cycles in great detail, the functions which achieve the upper and lower bounds, as well as the realization of the intermediate values.

Keywords

Cite

@article{arxiv.1106.1147,
  title  = {Domination in Functigraphs},
  author = {Linda Eroh and Ralucca Gera and Cong X. Kang and Craig E. Larson and Eunjeong Yi},
  journal= {arXiv preprint arXiv:1106.1147},
  year   = {2012}
}

Comments

18 pages, 8 figures

R2 v1 2026-06-21T18:18:31.166Z