Weak Unbounded Norm Topology and Dounford-Pettis Operators
Abstract
In this paper, we study un-dual (in symbol, E) of Banach lattice E and compare it with topological dual E*. If E* has order continuous norm, then E* = E. We introduce and study weakly unbounded norm topology (wun-topology) on Banach lattices and compare it with weak topology and uaw-topology. In the final, we introduce and study wun-Dunford-Pettis opertors from a Banach lattice E into Banach space X and we investigate some of its properties and its relationships with others known operators.
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