September 2023 Perturbations of parabolic equations and diffusion processes with degeneration: Boundary problems, metastability, and homogenization
Mark Freidlin, Leonid Koralov
Author Affiliations +
Ann. Probab. 51(5): 1752-1784 (September 2023). DOI: 10.1214/23-AOP1631

Abstract

We study diffusion processes that are stopped or reflected on the boundary of a domain. The generator of the process is assumed to contain two parts: the main part that degenerates on the boundary in a direction orthogonal to the boundary and a small nondegenerate perturbation. The behavior of such processes determines the stabilization of solutions to the corresponding parabolic equations with a small parameter. Metastability effects arise in this case: the asymptotics of solutions, as the size of the perturbation tends to zero, depends on the time scale. Initial-boundary value problems with both the Dirichlet and the Neumann boundary conditions are considered. We also consider periodic homogenization for operators with degeneration.

Funding Statement

The work of L. Koralov was supported by the Simons Foundation Fellowship (award number 678928).

Citation

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Mark Freidlin. Leonid Koralov. "Perturbations of parabolic equations and diffusion processes with degeneration: Boundary problems, metastability, and homogenization." Ann. Probab. 51 (5) 1752 - 1784, September 2023. https://doi.org/10.1214/23-AOP1631

Information

Received: 1 March 2022; Revised: 1 April 2023; Published: September 2023
First available in Project Euclid: 14 September 2023

MathSciNet: MR4642223
Digital Object Identifier: 10.1214/23-AOP1631

Subjects:
Primary: 35B27 , 35B40 , 35K20 , 35K65 , 60F10 , 60J60

Keywords: asymptotic problems for PDEs , Equations with degeneration on the boundary , metastability , stabilization in parabolic equations

Rights: Copyright © 2023 Institute of Mathematical Statistics

Vol.51 • No. 5 • September 2023
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