Mixing time upper bound for the uniformized Rosenthal walk on the special orthogonal groups

Abstract

We prove that a uniformized variant of both the Rosenthal walk Rosenthal and the Kac random walk Kac on SO(n) mixes in (n3) steps in total variation distance. The proof also extends easily to Rosenthal walk with fixed angle θ ≠ π. To the best of our knowledge, this is the first polynomial time bound for both walks. The techniques employed are mainly from representation theory of SO(n). But a crucial new ingredient is the interpretation of the Fourier coefficients of the character ratio as counting the number of particle cascade paths arising from the classical branching rules.