Semi unbounded order convergent in ordered vector spaces
Abstract
Let X be an ordered vector space. The net \xα\⊂eq X is semi unbounded order convergent to x (in symbol xαsuox), if there is a net \yβ\, possibly over a different index set, such that yβ 0 and for every β there exists α0 such that \\(xα - x)\u,y\l⊂eq \yβ\l, whenever α ≥ α0 and for all 0≤ y ∈ X. In vector lattice E, semi unbounded order convergence is equivalent with unbounded order convergence. We study some properties of this convergence and some of its relationships with others known order convergence.
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