Large deviation for small noise path-dependent stochastic differential equations
Abstract
In this paper, we study the asymptotic behavior of randomly perturbed path-dependent stochastic differential equations with small parameter , when → 0, goes to 0. When → 0, we establish large deviation principle. The proof of the results relies on the weak convergence approach. As an application, we establish the large deviation for functionals of path-dependent SDEs in small time intervals.
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