Ann. Inst. H. Poincaré (B) Probab. Statist. 58 (2022) 1328-1350.
Ilya Chevyrev, Peter Friz, Alexey Korepanov, Ian Melbourne and Huilin Zhang
Abstract
We consider deterministic homogenization for discrete-time fast-slow systems of the form
Xk+1 = Xk + n-1an(Xk,Yk) + n-1/2bn(Xk,Yk), Yk+1 = TnYk
and give conditions under which the dynamics of the slow equations converge weakly to an Itô diffusion X as n→∞.
The drift and diffusion coefficients of the limiting stochastic differential equation satisfied by X are given explicitly.
This extends the results of [Kelly-Melbourne, J. Funct. Anal. 272 (2017) 4063-4102] from the continuous-time case to the discrete-time case.
Moreover, our methods (càdlàg p-variation rough paths) work under optimal moment assumptions.
Combined with parallel developments on martingale approximations for families of nonuniformly expanding maps in Part 1 by Korepanov, Kosloff and Melbourne, we obtain optimal homogenization results when Tn is such a family of maps.