On coupled systems of Kolmogorov equations with applications to stochastic differential games

Abstract

We prove that a family of linear bounded evolution operators ( G(t,s))t s∈ I can be associated, in the space of vector-valued bounded and continuous functions, to a class of systems of elliptic operators A with unbounded coefficients defined in I× (where I is a right-halfline or I=) all having the same principal part. We establish some continuity and representation properties of ( G(t,s))t s∈ I and a sufficient condition for the evolution operator to be compact in Cb(;m). We prove also a uniform weighted gradient estimate and some of its more relevant consequence.