Durmus, A., Eberle, A., GUILLIN, A., & Schuh, K. (2023). Sticky nonlinear SDEs and convergence of McKean–Vlasov equations without confinement. Stochastics and Partial Differential Equations: Analysis and Computations. https://doi.org/10.1007/s40072-023-00315-8
We develop a new approach to study the long time behaviour of solutions to nonlinear stochastic differential equations in the sense of McKean, as well as propagation of chaos for the corresponding mean-field particle system approximations. Our approach is based on a sticky coupling between two solutions to the equation. We show that the distance process between the two copies is dominated by a solution to a one-dimensional nonlinear stochastic differential equation with a sticky boundary at zero. This new class of equations is then analyzed carefully. In particular, we show that the dominating equation has a phase transition. In the regime where the Dirac measure at zero is the only invariant probability measure, we prove exponential convergence to equilibrium both for the one-dimensional equation, and for the original nonlinear SDE. Similarly, propagation of chaos is shown by a componentwise sticky coupling and comparison with a system of one dimensional nonlinear SDEs with sticky boundaries at zero. The approach applies to equations without confinement potential and to interaction terms that are not of gradient type.
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Project (external):
Deutsche Forschungsgemeinschaft (DFG) French National Research Agency