Mixing time of fractional random walk on finite fields

Jimmy He; Huy Tuan Pham; Max Wenqiang Xu

doi:10.1214/22-EJP858

2022 Mixing time of fractional random walk on finite fields

Jimmy He, Huy Tuan Pham, Max Wenqiang Xu

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Electron. J. Probab. 27: 1-15 (2022). DOI: 10.1214/22-EJP858

Abstract

We study a random walk on ${\mathbb{F}_{p}}$ defined by ${X_{n+1}}=1/ {X_{n}}+{\varepsilon _{n+1}}$ if ${X_{n}}\ne 0$ , and ${X_{n+1}}={\varepsilon _{n+1}}$ if ${X_{n}}=0$ , where ${\varepsilon _{n+1}}$ are independent and identically distributed. This can be seen as a non-linear analogue of the Chung–Diaconis–Graham process. We show that the mixing time is of order $\log p$ , answering a question of Chatterjee and Diaconis.

Acknowledgments

The authors thank Sourav Chatterjee, Persi Diaconis, Jacob Fox, Sean Eberhard, Ilya Shkredov, Kannan Soundararajan, Péter Varjú, Thuy Duong Vuong, and Yuval Wigderson for their help and comments on earlier drafts. We are greatly indebted to Péter Varjú for pointing out the many useful references to the study of spectral gap of Cayley graphs of ${\operatorname{SL}_{2}}({\mathbb{F}_{p}})$ , in particular, [6]. We thank the anonymous referees for helpful comments and corrections.

Citation

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Jimmy He. Huy Tuan Pham. Max Wenqiang Xu. "Mixing time of fractional random walk on finite fields." Electron. J. Probab. 27 1 - 15, 2022. https://doi.org/10.1214/22-EJP858