English

Burning Graph Powers and Branching Trees

Combinatorics 2026-05-01 v1 Discrete Mathematics

Abstract

Graph burning is a discrete-time process that models the spread of social contagion. Initially, all vertices are unburned. In each round, one unburned vertex is selected and burned, while any unburned vertex that has a burned neighbour from the previous round also becomes burned. The burning number of a graph is the minimum number of rounds needed to burn the entire graph. In this paper, we study the burning number of graph powers. First, we show that for a connected graph GG, its graph power GkG^k contains a (k+1)+(k+1)^+-branching tree as a spanning tree. A (k+1)+(k+1)^+-branching tree is one whose internal vertices have degree at least k+1k+1. We then show that (k+1)+(k+1)^+-branching trees on nn vertices have burning number at most 4(k1)nk2 \left\lceil{\sqrt{\frac{4(k-1)n}{k^2}}}~\right\rceil. As the burning number of a graph is at most the burning number of any of its spanning trees, this gives an upper bound on the burning number of graph powers. We also derive an explicit bound building on the results of Bastide et al., and identify the ranges of kk and nn for which our bound outperforms theirs. Finally, we show that b(Gk)(1+o(1))n/kb(G^k) \le (1+o(1))\sqrt{n/k} based on the asymptotic burning number bound of Norin and Turcotte.

Keywords

Cite

@article{arxiv.2604.23004,
  title  = {Burning Graph Powers and Branching Trees},
  author = {Jesper Jansson and Shashanka Kulamarva and Yukihiro Murakami and Nikolaas Verhulst},
  journal= {arXiv preprint arXiv:2604.23004},
  year   = {2026}
}

Comments

13 pages, 3 figures

R2 v1 2026-07-01T12:34:35.727Z