Random Walk with Shrinking Steps
Abstract
We outline basic properties of a symmetric random walk in one dimension, in which the length of the nth step equals lambdan, with lambda<1. As the number of steps N-->oo, the probability that the endpoint is at x, Plambda(x;N), approaches a limiting distribution Plambda(x) that has many beautiful features. For lambda<1/2, the support of Plambda(x) is a Cantor set. For 1/2<=lambda<1, there is a countably infinite set of lambda values for which Plambda(x) is singular, while Plambda(x) is smooth for almost all other lambda values. In the most interesting case of lambda=(sqrt5-1)/2=g, Pg(x) is riddled with singularities and is strikingly self-similar. The self-similarity is exploited to derive a simple form for the probability measure M(a,b)= intab Pg(x) dx.
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