Random Walks on Hyperspheres of Arbitrary Dimensions

Abstract

We consider random walks on the surface of the sphere Sn-1 (n ≥ 2) of the n-dimensional Euclidean space En, in short a hypersphere. By solving the diffusion equation in Sn-1 we show that the usual law <r2 > t valid in En-1 should be replaced in Sn-1 by the generic law < θ > (-t/τ), where θ denotes the angular displacement of the walker. More generally one has <Cn/2-1L(θ)> (-t/ τ(L,n)) where Cn/2-1L a Gegenbauer polynomial. Conjectures concerning random walks on a fractal inscribed in Sn-1 are given tentatively.

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