The four uniform completions of a unital archimedean vector lattice
Abstract
In the category \(V\) of unital archimedean vector lattices, four notions of uniform completeness obtain. In all cases completeness requires the convergence of uniformly Cauchy sequences; the completions are distinguished by the manner in which the convergence is regulated. Ordinary uniform convergence is regulated by the canonical unit \(1\). Inner relative uniform convergence, here termed iru-convergence, is regulated by an arbitrary positive element. Outer relative uniform convergence, here termed oru-convergence, is regulated by an arbitrary positive element of a vector lattice containing the given object as a sub-vector lattice. *-convergence is equivalent to ordinary uniform convergence on certain specified quotients of the vector lattice. In each case the complete objects form a full monoreflective subcategory of \(V\), denoted respectively \(ucV\), \(irucV\), \(orucV\), and \(*cV\). In this article we provide a unified development of these completions by means of a novel pointfree variant of the classical Yosida adjunction.
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