Continuous Ergodic Capacities

Abstract

The objective of this paper is to characterize the structure of the set for a continuous ergodic upper probability V=P∈P (Theorem main result): . contains a finite number of ergodic probabilities; . Any invariant probability in is a convex combination of those ergodic ones in ; . Any probability in coincides with an invariant one in on the invariant σ-algebra. The last property has already been obtained in Cerreia-Vioglio, Maccheroni, and Marinacci ergodictheorem, which firstly studied the ergodicity of such capacities. As an application of the characterization, we prove an ergodicity result (Theorem improve), which improves the result in ergodictheorem in the sense that the limit of the time mean of is bounded by the upper expectation P∈EP[], instead of the Choquet integral. Generally, the former is strictly smaller.