Order-to-topology continuous operators
Abstract
An operator T from vector lattice E into vector topology (F,τ) is said to be order-to-topology continuous whenever xαo0 implies Txατ0 for each (xα)α⊂ E. The collection of all order-to-topology continuous operators will be denoted by Loτ(E,F). In this paper, we will study some properties of this new classification of operators. We will investigate the relationships between order-to-topology continuous operators and others classes of operators such as order continuous, order weakly compact and b-weakly compact operators.
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