Stochastic limits of Quantum repeated measurements

Antoine Jacquier; Kostas Kardaras; Adeline Viot

Paper

Stochastic limits of Quantum repeated measurements

Abstract

We investigate quantum systems perturbed by noise in the form of repeated interactions between the system and the environment. As the number of interactions (aka time steps) tends to infinity, we show, following the works by Pellegrini, that this system converges to the solution of a Volterra stochastic differential equation. This development sets interesting future research paths at the intersection of quantum algorithms, stochastic differential equations, weak convergence and large deviations.