Abstract
For two graphs G and H, the corona product is the graph obtained by taking one copy of G and copies of H, and joining the ith vertex of G with every vertex of the ith copy of H. In this paper, we study the state transfer of corona relative to the signless Laplacian matrix. We explore some conditions that guarantee the signless Laplacian perfect state transfer in . We prove that has no signless Laplacian perfect state transfer for some special m. We also show that has pretty good state transfer but no perfect state transfer relative to the signless Laplacian matrix for a regular graph H. Furthermore, we show that has signless Laplacian pretty good state transfer, where is the cocktail party graph.
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Acknowledgments
We would like to thank the anonymous referee for careful reading of our manuscript and for invaluable comments.
Disclosure statement
No potential conflict of interest was reported by the authors.