Can one hear the shape of a random walk?
Abstract
To what extent is the underlying distribution of a finitely supported unbiased random walk on Z determined by the sequence of times at which the walk returns to the origin? The main result of this paper is that, in various senses, most unbiased random walks on Z are determined up to equivalence by the sequence I1,I2,I3,…, where In denotes the probability of being at the origin after n steps. We also give an application to an inverse problem from asymptotic representation theory. The proof uses Laplace's method and a delicate Galois-theoretic analysis which ultimately depends on the classification of finite simple groups.
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