Duality for unbounded order convergence and applications

“…An easy application of Theorem 2.4 is as follows. It is known from [3] that (L p ) ∼ uo = L q for 1 < p ≤ ∞ and p −1 + q −1 = 1 and (L 1 ) ∼ uo = {0}. Thus the relative L 0 -topology is locally convex on the unit ball of L p , 1 < p ≤ ∞, but not on the unit ball of L 1 .…”

“…[3,Theorem 2.3] characterizes X ∼ uo as the order continuous part of X ∼ n . We refer to [4] and [3] for facts about uo-convergence and uo-dual. The uo-convergence has garnered interest as the natural generalization of a.s.-convergence.…”

A local Hahn–Banach theorem and its applications

“…An easy application of Theorem 2.4 is as follows. It is known from [3] that (L p ) ∼ uo = L q for 1 < p ≤ ∞ and p −1 + q −1 = 1 and (L 1 ) ∼ uo = {0}. Thus the relative L 0 -topology is locally convex on the unit ball of L p , 1 < p ≤ ∞, but not on the unit ball of L 1 .…”

“…[3,Theorem 2.3] characterizes X ∼ uo as the order continuous part of X ∼ n . We refer to [4] and [3] for facts about uo-convergence and uo-dual. The uo-convergence has garnered interest as the natural generalization of a.s.-convergence.…”

A local Hahn–Banach theorem and its applications

“…Troitsky, and F. Xanthos. The sharpest result is [GLX,Proposition 3.1]; it states that a Banach lattice whose order continuous dual separates points is boundedly uo-complete iff it is monotonically complete. In this section, we remove the restriction on the order continuous dual.…”

Completeness of unbounded convergences

“…For general results on uo-convergence and its unbounded norm version we refer the reader to [GX14,Gao14,KMT17,GTX,LC]. For applications of uoconvergence and its techniques to Mathematical finance we refer the reader to [GLX,GLX2].…”

The countable sup property for lattices of continuous functions