First order equation on random measures as superposition of weak solutions to the McKean-Vlasov equation
Abstract
The goal of this paper is to define an evolution equation for a curve of random probability measures (Mt)t∈[0,T]⊂ P(P(Rd)) associated to a non-local drift b:[0,T]×Rd × P(Rd) Rd and a non-local diffusion term a:[0,T]× Rd × P(Rd) Sym+(Rd× d). Then, we show that any solution to that equation can be lifted to a superposition of solutions to a non-linear Kolmogorov-Fokker-Planck equation and also to a superposition of weak solutions to the McKean-Vlasov equations. Finally, we use this superposition result to show how existence and uniqueness can be transferred from the equation on random measures to the associated non-linear Kolmogorov-Fokker-Planck equation and to the McKean-Vlasov equation, assuming uniqueness of the linearized KFP.
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