Simultaneous Small Noise Limit for Singularly Perturbed Slow-Fast Coupled Diffusions

Abstract

We consider a simultaneous small noise limit for a singularly perturbed coupled diffusion described by eqnarray* dXt &=& b(Xt, Yt)dt + αdBt, dYt &=& - 1 ∇yU(Xt, Yt)dt + s() dWt, eqnarray* where Bt, Wt are independent Brownian motions on Rd and Rm respectively, b : Rd × Rm → Rd, U : Rd × Rm → R and s :(0,∞) → (0,∞). We impose regularity assumptions on b, U and let 0 < α < 1. When s() goes to zero slower than a prescribed rate as → 0, we characterize all weak limit points of X, as → 0, as solutions to a differential equation driven by a measurable vector field. Under an additional assumption on the behaviour of U(x, ·) at its global minima we characterize all limit points as Filippov solutions to the differential equation.