Fractional revival on quasi-abelian Cayley graphs
Abstract
Fractional revival, a quantum transport phenomenon critical to entanglement generation in quantum spin networks, generalizes the notion of perfect state transfer on graphs. A Cayley graph Cay(G,S) is called quasi-abelian if its connection set S is a union of conjugacy classes of the group G. In this paper, we establish a necessary and sufficient condition for quasi-abelian Cayley graphs to have fractional revival. This extends a result of Cao and Luo (2022) on the existence of fractional revival in Cayley graphs over abelian groups.
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