Mixing time of the torus shuffle
Abstract
We prove a theorem that reduces bounding the mixing time of a card shuffle to verifying a condition that involves only triplets of cards. Then we use it to analyze a classic model of card shuffling. In 1988, Diaconis introduced the following Markov chain. Cards are arranged in an n by n grid. Each step, choose a row or column, uniformly at random, and cyclically rotate it by one unit in a random direction. He conjectured that the mixing time is O(n3 n). We obtain a bound that is within a poly log factor of the conjecture.
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