Three Favorite Edges Occurs Infinitely Often for One-Dimensional Simple Random Walk
Abstract
For a one-dimensional simple symmetric random walk (Sn), an edge x (between points x-1 and x) is called a favorite edge at time n if its local time at n achieves the maximum among all edges. In this paper, we show that with probability 1 three favorite edges occurs infinitely often. Our work is inspired by T\'oth and Werner [Combin. Probab. Comput. 6 (1997) 359-369], and Ding and Shen [Ann. Probab. 46 (2018) 2545-2561], disproves a conjecture mentioned in Remark 1 on page 368 of T\'oth and Werner [Combin. Probab. Comput. 6 (1997) 359-369].
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