Hopping Forcing Number in Random $d$-regular Graphs
Abstract
Hopping forcing is a single player combinatorial game in which the player is presented a graph on vertices, some of which are initially blue with the remaining vertices being white. In each round , a blue vertex with all neighbours blue may hop and colour a white vertex blue in the second neighbourhood, provided that has not performed a hop in the previous rounds. The objective of the game is to eventually colour every vertex blue by repeatedly applying the hopping forcing rule. Subsequently, for a given graph , the hopping forcing number is the minimum number of initial blue vertices that are required to achieve the objective. In this paper, we study the hopping forcing number for random -regular graphs. Specifically, we aim to derive asymptotic upper and lower bounds for the hopping forcing number for various values of .
Cite
@article{arxiv.2410.08380,
title = {Hopping Forcing Number in Random $d$-regular Graphs},
author = {Pawel Pralat and Harjas Singh},
journal= {arXiv preprint arXiv:2410.08380},
year = {2024}
}
Comments
20 pages