Uniform Mixing on Cayley Graphs
Abstract
We provide new examples of Cayley graphs on which the quantum walks reach uniform mixing. Our first result is a complete characterization of all 2(d+2)-regular Cayley graphs over Z3d that admit uniform mixing at time 2π/9. Our second result shows that for every integer k 3, we can construct Cayley graphs over Zqd that admit uniform mixing at time 2π/qk, where q=3, 4. We also find the first family of irregular graphs, the Cartesian powers of the star K1,3, that admit uniform mixing.
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