On the Ambrosio-Figalli-Trevisan superposition principle for probability solutions to Fokker-Planck-Kolmogorov equations

Abstract

We prove a generalization of the known result of Trevisan on the Ambrosio-Figalli-Trevisan superposition principle for probability solutions to the Cauchy problem for the Fokker-Planck-Kolmogorov equation, according to which such a solution is generated by a solution to the corresponding martingale problem. The novelty is that in place of the integrability of the diffusion and drift coefficients A and b with respect to the solution we require the integrability of (\|A(t,x)\|+| b(t,x),x |)/(1+|x|2). Therefore, in the case where there are no a priori global integrability conditions the function \|A(t,x)\|+| b(t,x),x | can be of quadratic growth. Moreover, as a corollary we obtain that under mild conditions on the initial distribution it is sufficient to have the one-sided bound b(t,x),x C+C|x|2 |x| along with \|A(t,x)\| C+C|x|2 |x|.