The exponential resolvent of a markov process and large deviations for markov processes via hamilton-jacobi equations

Journal article (2020)

Authors

R.C. Kraaij Applied Probability - EEMCS
Research Group
Applied Probability (EEMCS) (TU Delft)
Copyright: © 2020 R.C. Kraaij
DOI: https://doi.org/10.1214/20-EJP539
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Published Date

2020

Language

English

Faculty

Electrical Engineering, Mathematics and Computer Science

Department

Delft Institute of Applied Mathematics

Research Group

Applied Probability

Abstract

We study the Hamilton-Jacobi equation f − λHf = h, where Hf = e−f Aef and where A is an operator that corresponds to a well-posed martingale problem. We identify an operator that gives viscosity solutions to the Hamilton-Jacobi equa-tion, and which can therefore be interpreted as the resolvent of H. The operator is given in terms of an optimization problem where the running cost is a path-space relative entropy. Finally, we use the resolvents to give a new proof of the abstract large deviation result of Feng and Kurtz (2006).