Large Deviations for Non-Markovian Diffusions and a Path-Dependent Eikonal Equation

Abstract

This paper provides a large deviation principle for Non-Markovian, Brownian motion driven stochastic differential equations with random coefficients. Similar to Gao and Liu GL, this extends the corresponding results collected in Freidlin and Wentzell FreidlinWentzell. However, we use a different line of argument, adapting the PDE method of Fleming Fleming and Evans and Ishii EvansIshii to the path-dependent case, by using backward stochastic differential techniques. Similar to the Markovian case, we obtain a characterization of the action function as the unique bounded solution of a path-dependent version of the Eikonal equation. Finally, we provide an application to the short maturity asymptotics of the implied volatility surface in financial mathematics.