Geometric Deviation From Lévy's Occupation Time Arcsine Law

Published 21 Apr 2020 in math.PR | (2004.10039v1)

Abstract: We prove a geometric extension of L\'evy's occupation time arcsine law near a hypersurface on a Riemannian manifold. The deviation from the classic arcsine law is of the order of the square-root of the time horizon and is expressed explicitly in terms of the mean curvature of the hypersurface and the local time of the underlying standard Brownian motion.

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Geometric Deviation From Lévy's Occupation Time Arcsine Law

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