On Various Modes of Scalar Convergence in L0(X)
Abstract
A sequence \fn\ of strongly-measurable functions taking values in a Banach space is scalarly null a\.e\. (resp. scalarly null in measure) if x*fn →0 a\.e\. (resp. x*fn → 0 in measure) for every x*∈ *. Let 1 p ∞. The main questions addressed in this paper are whether an Lp()-bounded sequence that is scalarly null a\.e\. will converge weakly a\.e\. (or have a subsequence which converges weakly a\.e\.), and whether an Lp()-bounded sequence that is scalarly null in measure will have a subsequence that is scalarly null a\.e. The answers to these and other similar questions depend upon p and upon the geometry of .
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