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Lemme de coherence et théorème de Noether stochastique (2005)

Abstract

The stochastic embedding procedure associates a stochastic Euler-Lagrange equation (SEL) to the standard Euler-Lagrange equation (EL). Can we derive (SEL) from a generalized least action principle? To address this question, we develop a stochastic calculus of variation initiated by Yasue. We give a stochastic analog F of the lagrangian action functional. We introduce a notion of stationarity according to which the solutions of (SEL) are the stationary points of F. This notion of stationarity brings coherence to stochastic calculus of variation with respect to stochastic embedding. Finally, we prove a stochastic Noether theorem which introduces an original notion of stochastic first integral.

Publication details

Download	http://hal.archives-ouvertes.fr/hal-00012929/en/
Publisher	HAL - CCSD
Repository	CCSd/HAL : e-articles server (based on gBUS) (France)
Keywords	Mathematics/Probability, Mathematics/Dynamical Systems, Stochastic calculus of variation, Stochastic Noether theorem, stochastic first integral, stochastic embedding
Language	French
Relation	http://hal.archives-ouvertes.fr/docs/00/04/18/53/PDF/note2.pdf

Cited publications (3)

Mathematical methods of classical mechanics / V.I. Arnoldtranslated by K. Vogtman and A. Weinstem (1989)

Arnol'd, V.I. (Vladimir Igorevich), 1937-

Stochastic embedding of dynamical systems (2005)

Dynamical Theories of Brownian Motion (2001)

Edward Nelson