This paper studies the asymptotics of the Brownian integrals with paths restricted to a bounded domain of Rν , when the domain is dilated to infinity. The framework is that of the Bose- Einstein statistics with paths observed within random time intervals which are integer multiplies of some fixed β > 0. The three first terms of the asymptotics are found explicitly via the functional integrals. In the case of a gas of interacting Brownian loops an expression for the volume term of the asymptotics of the log-partition function is found and the correction term is proved by order to be the boundary area of the domain.

Asymptotics of Brownian integrals and pressure. Bose – Einstein statistics

FRIGIO, Sandro;
2007-01-01

Abstract

This paper studies the asymptotics of the Brownian integrals with paths restricted to a bounded domain of Rν , when the domain is dilated to infinity. The framework is that of the Bose- Einstein statistics with paths observed within random time intervals which are integer multiplies of some fixed β > 0. The three first terms of the asymptotics are found explicitly via the functional integrals. In the case of a gas of interacting Brownian loops an expression for the volume term of the asymptotics of the log-partition function is found and the correction term is proved by order to be the boundary area of the domain.
2007
262
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Utilizza questo identificativo per citare o creare un link a questo documento: https://hdl.handle.net/11581/107687
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