English

Approximating TSP walks in subcubic graphs

Combinatorics 2021-12-14 v1 Discrete Mathematics Data Structures and Algorithms

Abstract

We prove that every simple 2-connected subcubic graph on nn vertices with n2n_2 vertices of degree 2 has a TSP walk of length at most 5n+n241\frac{5n+n_2}{4}-1, confirming a conjecture of Dvo\v{r}\'ak, Kr\'al', and Mohar. This bound is best possible; there are infinitely many subcubic and cubic graphs whose minimum TSP walks have lengths 5n+n241\frac{5n+n_2}{4}-1 and 5n42\frac{5n}{4} - 2 respectively. We characterize the extremal subcubic examples meeting this bound. We also give a quadratic-time combinatorial algorithm for finding such a TSP walk. In particular, we obtain a 54\frac{5}{4}-approximation algorithm for the graphic TSP on simple cubic graphs, improving on the previously best known approximation ratio of 97\frac{9}{7}.

Cite

@article{arxiv.2112.06278,
  title  = {Approximating TSP walks in subcubic graphs},
  author = {Michael C. Wigal and Youngho Yoo and Xingxing Yu},
  journal= {arXiv preprint arXiv:2112.06278},
  year   = {2021}
}

Comments

30 pages

R2 v1 2026-06-24T08:14:02.720Z