On closedness of law-invariant convex sets in rearrangement invariant spaces
Abstract
This paper presents relations between several types of closedness of a law-invariant convex set in a rearrangement invariant space X. In particular, we show that order closedness, σ(X,Xn)-closedness and σ(X,L∞)-closedness of a law-invariant convex set in X are equivalent, where Xn is the order continuous dual of X. We also provide some application to proper quasiconvex law-invariant functionals with the Fatou property.
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