Large deviation for diffusions and Hamilton–Jacobi equation in Hilbert spaces

Large deviation for diffusions and Hamilton–Jacobi equation in Hilbert spaces

Jin Feng

Source: Ann. Probab. Volume 34, Number 1 (2006), 321-385.

Abstract

Large deviation for Markov processes can be studied by Hamilton–Jacobi equation techniques. The method of proof involves three steps: First, we apply a nonlinear transform to generators of the Markov processes, and verify that limit of the transformed generators exists. Such limit induces a Hamilton–Jacobi equation. Second, we show that a strong form of uniqueness (the comparison principle) holds for the limit equation. Finally, we verify an exponential compact containment estimate. The large deviation principle then follows from the above three verifications.

This paper illustrates such a method applied to a class of Hilbert-space-valued small diffusion processes. The examples include stochastically perturbed Allen–Cahn, Cahn–Hilliard PDEs and a one-dimensional quasilinear PDE with a viscosity term. We prove the comparison principle using a variant of the Tataru method. We also discuss different notions of viscosity solution in infinite dimensions in such context.

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Primary Subjects: 60F10

Secondary Subjects: 60J25, 49L25, 60G99

Keywords: Large deviation; stochastic evolution equation in Hilbert space; viscosity solution of Hamilton–Jacobi equations

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Links and Identifiers

Permanent link to this document: http://projecteuclid.org/euclid.aop/1140191540
Digital Object Identifier: doi:10.1214/009117905000000567
Mathematical Reviews number (MathSciNet): MR2206350
Zentralblatt MATH identifier: 1091.60002

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