Multiplicative order compact operators between vector lattices and l-algebras
Abstract
In the present paper, we introduce and investigate the multiplicative order compact operators from vector lattices to l-algebras. A linear operator T from a vector lattice X to an l-algebra E is said to be omo-compact if every order bounded net xα in X possesses a subnet xαβ such that Txαβ y for some y∈ E. We also introduce and study omo-M- and omo-L-weakly compact operators from vector lattices to l-algebras.
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