Invariant Sublinear Expectations
Abstract
We first give a decomposition for a T-invariant sublinear expectation E=P∈EP, and show that each component E(d)=P∈(d)EP of the decomposition has a finite period pd∈N, i.e., \[E(d)[f-f Tpd]=0, f∈H.\] Then we prove that a continuous invariant sublinear expectation that is strongly ergodic has a finite period pE, and each component (d) of its periodic decomposition is the convex hull of a finite set of Tpd-ergodic probabilities. As an application of the characterization, we prove an ergodicity result which shows that the limit of the pE-step time means achieves the upper expectation.
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