Abstract
The aim of this paper is twofold. - In the setting of RCD(K, infinity) metric measure spaces, we derive uniform gradient and Laplacian contraction estimates along solutions of the viscous approximation of the Hamilton-Jacobi equation. We use these estimates to prove that, as the viscosity tends to zero, solutions of this equation converge to the evolution driven by the Hopf-Lax formula, in accordance with the smooth case. - We then use such convergence to study the small-time Large Deviation Principle for both the heat kernel and the Brownian motion: we obtain the expected behavior under the additional assumption that the space is proper. As an application of the latter point, we also discuss the Gamma-convergence of the Schrödinger problem to the quadratic optimal transport problem in proper RCD(K, infinity) spaces.
Lingua originale | English |
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pagine (da-a) | 1-31 |
Numero di pagine | 31 |
Rivista | Potential Analysis |
DOI | |
Stato di pubblicazione | Pubblicato - 2024 |
Keywords
- Hamilton-Jacobi equations
- Large deviations
- RCD spaces