A functional representation approach to vector lattice covers for spaces of compact operators
Abstract
For ordered normed vector spaces X, Y, we consider the space L(X,Y) of bounded linear operators and characterize when its cone of positive operators has non-empty interior. When this is satisfied, we give a functional representation of the closure C(X,Y) of the finite rank operators in L(X,Y). This space is particularly interesting since it coincides in many cases with the space of compact operators from X to Y. Our functional representation has very good order properties in the sense that it is a so-called vector lattice cover of C(X,Y). This can be used to characterize disjointness of operators in C(X,Y) and to determine which operators have a modulus in C(X,Y). We demonstrate how our results can be applied to a variety of concrete spaces.
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