Convergence of Unbounded Multivalued Supermartingales in the Mosco and Slice Topologies
نویسنده
چکیده
Our starting point is the Mosco-convergence result due to Hess ((He'89]) for integrable multivalued supermartingales whose values may be unbounded, but are majorized by a w-ball-compact-valued function. It is shown that the convergence takes place also in the slice topology. In the case when both the underlying space X and its dual X have the Radon-Nikodym property a weaker compactness assumption guarantees convergence of the multi-valued supermartingales in the slice topology. This result implies convergence in the Mosco topology and gives an analogue of Hess' result in the case when X and X have the RNP. Finally the results are restated in terms of normal integrands.
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