Disjointly weak compactness in Banach lattices.

We give some characterizations of disjointly weakly compact sets in Banach lattices, namely, those sets in whose solid hulls every disjoint sequence converges weakly to zero. As an application, we prove that a bounded linear operator from a Banach space to a Banach lattice is an almost (L) limited operator if and only if it is a disjointly weakly compact operator, indeed, an operator which carries bounded sets to disjointly weakly compact ones. Some results on weak precompactness and (L -, M-)weak compactness of disjointly weakly compact operators are also obtained. [ABSTRACT FROM AUTHOR]