Komlos Properties in Banach Lattices
Abstract
Several Koml\'os like properties in Banach lattices are investigated. We prove that C(K) fails the oo-pre-Koml\'os property, assuming that the compact Hausdorff space K has a nonempty separable open subset U without isolated points such that every u∈ U has countable neighborhood base. We prove also that for any infinite dimensional Banach lattice E there is an unbounded convex uo-pre-Koml\'os set C⊂eq E+ which is not uo-Koml\'os.
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