English

Dirac's Condition for Spanning Halin Subgraphs

Combinatorics 2017-07-18 v2

Abstract

Let GG be an nn-vertex graph with n3n\ge 3. A classic result of Dirac from 1952 asserts that GG is hamiltonian if δ(G)n/2\delta(G)\ge n/2. Dirac's theorem is one of the most influential results in the study of hamiltonicity and by now there are many related known results\,(see, e.g., J. A. Bondy, Basic Graph Theory: Paths and Circuits, Chapter 1 in: {\it Handbook of Combinatorics Vol.1}). A {\it Halin graph} is a planar graph consisting of two edge-disjoint subgraphs: a spanning tree of at least 4 vertices and with no vertex of degree 2, and a cycle induced on the set of the leaves of the spanning tree. Halin graphs possess rich hamiltonicity properties such as being hamiltonian, hamiltonian connected, and almost pancyclic. As a continuous "generalization" of Dirac's theorem, in this paper, we show that there exists a positive integer n0n_0 such that any graph GG with nn0n\ge n_0 vertices and δ(G)(n+1)/2\delta(G)\ge (n+1)/2 contains a spanning Halin subgraph. In particular, it contains a spanning Halin subgraph which is also pancyclic.

Keywords

Cite

@article{arxiv.1505.06181,
  title  = {Dirac's Condition for Spanning Halin Subgraphs},
  author = {Guantao Chen and Songling Shan},
  journal= {arXiv preprint arXiv:1505.06181},
  year   = {2017}
}

Comments

25 pages, 3 figures

R2 v1 2026-06-22T09:39:44.980Z