Annealed limit for a diffusive disordered mean-field model with random jumps

Abstract

We study a sequence of N-particle mean-field systems, each driven by N simple point processes ZN,i in a random environment. Each ZN,i has the same intensity (f(XNt-))t and at every jump time of ZN,i, the process XN does a jump of height Ui/N where the Ui are disordered centered random variables attached to each particle. We prove the convergence in distribution of XN to some limit process X that is solution to an SDE with a random environment given by a Gaussian variable, with a convergence speed for the finite-dimensional distributions. This Gaussian variable is created by a CLT as the limit of the patial sums of the Ui. To prove this result, we use a coupling for the classical CLT relying on the result of [Koml\'os, Major and Tusn\'ady (1976)], that allows to compare the conditional distributions of XN and X given the random environment, with the same Markovian technics as the ones used in [Erny, L\"ocherbach and Loukianova (2022)].