A generalization of order convergence

Abstract

Let E be a sublattice of a vector lattice F. ( xα )⊂eq E is said to be F -order convergent to a vector x (in symbols xα Fo x ), whenever there exists another net (yα) in F with the some index set satisfying yα 0 in F and | xα - x | ≤ yα for all indexes α . If F=E, this convergence is called b-order convergence and we write xα bo x. In this manuscript, first we study some properties of Fo-convergence nets and we extend some results to the general case. In the second part, we introduce b-order continuous operators and we invistegate some properties of this new concept. An operator T between two vector lattices E and F is said to be b-order continuous, if xα bo 0 in E implies Txα bo 0 in F.