The burning number conjecture holds for trees of order n with at most n-1 degree-2 vertices

Abstract

Inspired by the spread of information in social networks and graph-theoretic processes such as Firefighting and graph cleaning, Bonato, Janssen and Roshanbin introduced in 2016 the burning number b(G) of any finite graph G. They conjectured that b(G) n12 holds for all connected graphs G of order n, and observed that it suffices to prove the conjecture for all trees. In 2024, Murakami confirmed the conjecture for trees without degree-2 vertices. In this paper, we prove that for all trees T of order n with n2 degree-2 vertices, b(T) (n+n2-n+n2+0.25-1.5)12. Hence, the conjecture holds for all trees of order n with at most n-1 degree-2 vertices.