Skew-product decomposition of Brownian motion on ellipsoid
Abstract
In this article we obtain a skew-product decomposition of a Brownian motion on an ellipsoid of dimension n in a Euclidean space of dimension n+1. We only consider such ellipsoid whose restriction to first n dimensions is a sphere and its last coordinate depends on a variable parameter. We prove that the projection of this Brownian motion on to the last coordinate is, after a suitable transformation, a Wright-Fisher diffusion process with atypical selection coefficient.
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