Distribution-Dependent Stochastic Differential Delay Equations in finite and infinite dimensions

Abstract

We prove that distribution dependent (also called McKean--Vlasov) stochastic delay equations of the form equation* dX(t)= b(t,Xt,LXt)dt+ σ(t,Xt,LXt)dW(t) equation* have unique (strong) solutions in finite as well as infinite dimensional state spaces if the coefficients fulfill certain monotonicity assumptions.