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Bonato et al. (2014, 2015) defined the burning number of a simple graph as follows. Consider a process called burning involving are discrete time steps. Each node is either burned or unburned; if a node is burned, then it remains in that state until the end of the process. In every round, choose one additional unburned node to burn (if such a node is available). Once a node is burned in round , in round , each of its unburned neighbors becomes burned. The process ends when all nodes are burned. The burning number of a graph , written by , is then defined as the minimum number of rounds needed for the process to end.
Bonato et al. (2015) showed that for a traceable graph with vertex count ,
(1) |
and conjecture that this inequality holds for any connected graph. Bonato (2020) calls this statement the "burning number conjecture," and terms any graph that satisfies the inequality "well-burnable." The best known upper bound is given by
(2) |
(Land and Lu 2016, Bonato 2020).
For any graph with graph radius and graph diameter ,
(3) |
(Bonato 2020).
Values for some parametrized families of graphs are summarized below, where denotes the ceiling function.
family | |
cocktail party graph | 2 |
crown graph | 3 |
cycle graph | |
empty graph | |
gear graph | 3 |
helm graph | 3 |
ladder rung graph | |
odd graph | |
path graph | |
rook graph | 3 |
star graph | |
sun graph | 3 |
transposition graph | |
wheel graph | 2 |
In addition, the hypercube graph satisfies up to at least . The Möbius ladder agrees with AA155934 up to at least .
Bonato et al. (2015) show that
(4) |
where is the graph diameter and is the graph radius of a graph as well as that graph complement of , then
(5) |
if is the graph complement of .
Bessy, S.; Bonato, A.; Jansen, J.; Rautenbach, D.; and Roshanbin, E. "Bounds on the Burning Number." 2 Nov 2016. https://arxiv.org/abs/1511.06023.
Bonato, S. "A Survey of Graph Burning." 22 Sep 2020. https://arxiv.org/abs/2009.10642v1.
Bonato, A.; Janssen, J.; and Roshanbin, E. "Burning a Graph as a Model of Social Contagion." In Algorithms and Models for the Web Graph: 11th International Workshop, WAW 2014, Beijing, China, December 17-18, 2014, Proceedings (
Ed. A. Bonato A., F. Graham F., and P. Prałat). Springer, pp. 13-22, 2014.
Bonato, A.; Janssen, J.; and Roshanbin, E. "How to Burn a Graph." To appear in Internet Mathematics. 23 Jul 2015. https://arxiv.org/abs/1507.06524.
Land, M. and Lu, L. "An Upper Bound on Burning Number of Graphs." In Proceedings of WAW'16. 2016.
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اكتشاف أكبر مرجان في العالم قبالة سواحل جزر سليمان
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