On multiplicative Chung--Diaconis--Graham process

Abstract: We study the lazy Markov chain on $\mathbf{F}p$ defined as $X{n+1}=X_n$ with probability $1/2$ and $X_{n+1}=f(X_n) \cdot \varepsilon_{n+1}$, where $\varepsilon_n$ are random variables distributed uniformly on ${ \gamma^{}, \gamma^{-1}}$, $\gamma$ is a primitive root and $f(x) = \frac{x}{x-1}$ or $f(x)=\mathrm{ind} (x)$. Then we show that the mixing time of $X_n$ is $\exp(O(\log p / \log \log p))$. Also, we obtain an application to an additive--combinatorial question concerning a certain Sidon--type family of sets.