The surface limit of Brownian motion in tubular neighborhoods of an embedded Riemannian manifold

N.A. Sidorova; O.G. Smolyanov; H. Weizsäcker, von; O. Wittich

doi:10.1016/S0022-1236(03)00067-3

The surface limit of Brownian motion in tubular neighborhoods of an embedded Riemannian manifold

N.A. Sidorova
, O.G. Smolyanov
, H. Weizsäcker, von
, O. Wittich

Onderzoeksoutput: Bijdrage aan tijdschrift › Tijdschriftartikel › Academic › peer review

19 Citaten (Scopus)

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We construct the surface measure on the space C([0,1],M) of paths in a compact Riemannian manifold M without boundary embedded into which is induced by the usual flat Wiener measure on conditioned to the event that the Brownian particle does not leave the tubular -neighborhood of M up to time 1. We prove that the limit as ¿0 exists, the limit measure is equivalent to the Wiener measure on C([0,1],M), and we compute the corresponding density explicitly in terms of scalar and mean curvature.

Originele taal-2	Engels
Pagina's (van-tot)	391-413
Tijdschrift	Journal of Functional Analysis
Volume	206
Nummer van het tijdschrift	2
DOI's	https://doi.org/10.1016/S0022-1236(03)00067-3
Status	Gepubliceerd - 2004

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10.1016/S0022-1236(03)00067-3

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AU - Wittich, O.

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AB - We construct the surface measure on the space C([0,1],M) of paths in a compact Riemannian manifold M without boundary embedded into which is induced by the usual flat Wiener measure on conditioned to the event that the Brownian particle does not leave the tubular -neighborhood of M up to time 1. We prove that the limit as ¿0 exists, the limit measure is equivalent to the Wiener measure on C([0,1],M), and we compute the corresponding density explicitly in terms of scalar and mean curvature.

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The surface limit of Brownian motion in tubular neighborhoods of an embedded Riemannian manifold

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