order-norm continuous operators and order weakly compact operators

Abstract

Let E be a sublattice of a vector lattice F. A continuous operator T from the vector lattice E into a normed vector space X is said to be order-norm continuous whenever xαFo0 implies Txα.0 for each (xα)α⊂eq E. Our mean from the convergence xαFo x is that there exists another net (yα) in F with the same index set satisfying yα 0 in F and xα - x ≤ yα for all indexes α . In this paper, we will study some properties of this new class of operators and its relationships with some known classifications of operators. We also define the new class of operators that named order weakly compact operators. A continuous operator T: E → X is said to be order weakly compact, if T(A) in X is a relatively weakly compact set for each Fo-bounded A⊂eq E. In this manuscript, we study some properties of this class of operators and its relationships with order-norm continuous operators.