On multiplicative Chung--Diaconis--Graham process

Abstract

We study the lazy Markov chain on Fp defined as Xn+1=Xn with probability 1/2 and Xn+1=f(Xn) · n+1, where n are random variables distributed uniformly on \ γ, γ-1\, γ is a primitive root and f(x) = xx-1 or f(x)=ind (x). Then we show that the mixing time of Xn is (O( p / p)). Also, we obtain an application to an additive--combinatorial question concerning a certain Sidon--type family of sets.

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