Total variation bound for Kac's random walk
Abstract
We show that the classical Kac's random walk on (n-1)-sphere Sn-1 starting from the point mass at e1 mixes in O(n5( n)3) steps in total variation distance. The main argument uses a truncation of the running density after a burn-in period, followed by L2 convergence using the spectral gap information derived by other authors. This improves upon a previous bound by Diaconis and Saloff-Coste of order O(n2n).
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