Almost order-weakly compact operators on Banach lattices
Abstract
A continuous operator T between two Banach lattices E and F is called almost order-weakly compact, whenever for each almost order bounded subset A of E, T(A) is a relatively weakly compact subset of F. In Theorem 4, we show that the positive operator T from E into Dedekind complete F is almost order-weakly compact if and only if T(xn) \|.\|0 in F for each disjoint almost order bounded sequence \xn\ in E. In this manuscript, we study some properties of this class of operators and its relationships with others known operators.
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