On the existence of random mckean–vlasov limits for triangular arrays of exchangeable diffusions

Abstract

We characterize m-exchangeability for a large class of martingale problems on the usual space of continuous trajectories into (R^d)^m, in terms of the drift and diffusion coefficients. Under some Lipschitz conditions on the coefficients, the sequence of empirical measures associated with a triangular array of exchangeable diffusions is shown to be tight. The diffusions considered here may be very strongly correlated, in which case tightness entails the existence of “random McKean–Vlasov limits”.