The Escape Rate of Favorite Edges of Simple Random Walk
Abstract
Consider a simple symmetric random walk on the integer lattice Z. Let E(n) denote a favorite edge of the random walk at time n. In this paper, we study the escape rate of E(n), and show that almost surely n∞|E(n)|n·( n)-γ equals 0 if γ 1, and is infinity otherwise. We also obtain a law of the iterated logarithm for E(n).
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