Periodicity of Grover walks on distance-regular graphs
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Characterizations graphs of some classes to induce periodic Grover walks have been studied for recent years. In particular, for the strongly regular graphs, it has been known that there are only three kinds of such graphs. Here, we focus on the periodicity of the Grover walks on distance-regular graphs. The distance-regular graph can be regarded as a kind of generalization of the strongly regular graphs and the typical graph with an equitable partition. In this paper, we find some classes of such distance-regular graphs and obtain some useful necessary conditions to induce periodic Grover walks on the general distance-regular graphs. Also, we apply this necessary condition to give another proof for the strong regular graphs.
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Periodicity for the 3-state quantum walk on cycles
3-state Grover and Fourier quantum walks on C_N have finite period only for N=3 (T_3=6 and 12), via a cyclotomic field method that gives a necessary condition on coin operators.
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