Abstract We use the correlation matrix of the generating distribution to determine the mixing time for random walks on the torus (Z/q Z) ⁿ (Z / q Z) n. We present our method in the context of the Diaconis–Gangolli random walk on both the 1 n 1 × n and m n m × n contingency tables over Z/q Z Z / q Z. In the 1 n 1 × n case, we prove that the random walk exhibits cutoff at time n q² (n) 8 ² n q 2 log (n) 8 π 2 when q n q ≫ n ; in the m n m × n case, where m and n are of the same order, we establish cutoff for the random walk at time mn q² (mn) 16 ² m n q 2 log (m n) 16 π 2 when q n² q ≫ n 2. Our method reveals that a general class of random walks on the torus (Z/q Z) ⁿ (Z / q Z) n has cutoff. If each coordinate of the
Fang et al. (Wed,) studied this question.
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