Periodicity for the 3-state quantum walk on cycles

Abstract

Dukes (2014) and Konno, Shimizu, and Takei (2017) studied the periodicity for 2-state quantum walks whose coin operator is the Hadamard matrix on cycle graph CN with N vertices. The present paper treats the periodicity for 3-state quantum walks on CN. Our results follow from a new method based on cyclotomic field. This method shows a necessary condition for the coin operator of quantum walks to have the finite period. Moreover, we reveal the period TN of two kinds of typical quantum walks, the Grover and Fourier walks. We prove that both walks do not have any finite period except for N=3, in which case T3=6 (Grover), =12 (Fourier).