Nonlinear semigroups and limit theorems for convex expectations

Abstract

Based on the Chernoff approximation, we provide a general approximation result for convex monotone semigroups which are continuous w.r.t. the mixed topology on suitable spaces of continuous functions. Starting with a family (I(t))t≥ 0 of operators, the semigroup is constructed as the limit S(t)f:=n∞I(tn)n f and is uniquely determined by the time derivative I'(0)f for smooth functions. We identify explicit conditions for the generating family (I(t))t≥ 0 that are transferred to the semigroup (S(t))t≥ 0 and can easily be verified in applications. Furthermore, there is a structural link between Chernoff type approximations for nonlinear semigroups and law of large numbers and central limit theorem type results for convex expectations. The framework also includes large deviation results.