Existence of flows for linear Fokker-Planck-Kolmogorov equations and its connection to well-posedness

Abstract

Let the coefficients aij and bi, i,j ≤ d, of the linear Fokker-Planck-Kolmogorov equation (FPK-eq.) ∂tμt = ∂i∂j(aijμt)-∂i(biμt) be Borel measurable, bounded and continuous in space. Assume that for every s ∈ [0,T] and every Borel probability measure on Rd there is at least one solution μ = (μt)t ∈ [s,T] to the FPK-eq. such that μs = and t μt is continuous w.r.t. the topology of weak convergence of measures. We prove that in this situation, one can always select one solution μs, for each pair (s,) such that this family of solutions fulfills μs,t = μr,μs,rt for all 0 ≤ s ≤ r ≤ t ≤ T,which one interprets as a flow property of this solution family. Moreover, we prove that such a flow of solutions is unqiue if and only if the FPK-eq. is well-posed.