In this paper, we explicitly calculate the quasi-potentials for the damped semilinear stochastic wave equation when the system is of gradient type. We show that in this case the infimum of the quasi-potential with respect to all possible velocities does not depend on the density of the mass and does coincide with the quasi-potential of the corresponding stochastic heat equation that one obtains from the zero mass limit. This shows in particular that the Smoluchowski-Kramers approximation can be used to approximate long time behavior in the zero noise limit, such as exit time and exit place from a basin of attraction.
Smoluchowski-Kramers approximation and large deviations for infinite dimensional gradient systems / Sandra Cerrai; Michael Salins. - In: ASYMPTOTIC ANALYSIS. - ISSN 0921-7134. - STAMPA. - 88:(2014), pp. 201-215. [10.3233/ASY-141220]
Smoluchowski-Kramers approximation and large deviations for infinite dimensional gradient systems
CERRAI, SANDRA;
2014
Abstract
In this paper, we explicitly calculate the quasi-potentials for the damped semilinear stochastic wave equation when the system is of gradient type. We show that in this case the infimum of the quasi-potential with respect to all possible velocities does not depend on the density of the mass and does coincide with the quasi-potential of the corresponding stochastic heat equation that one obtains from the zero mass limit. This shows in particular that the Smoluchowski-Kramers approximation can be used to approximate long time behavior in the zero noise limit, such as exit time and exit place from a basin of attraction.
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