Some minimum topological spaces, and vector lattices
Abstract
We investigate the existence of compact Hausdorff spaces X that are minimum with respect to cX=K for some fixed covering operator c and compact Hausdorff space K with cK=K. Then, using the Yosida representation theorem, we show how that situation relates to the existence of Archimedean vector lattices A with distinguished strong unit that are minimum with respect to hA=H for some fixed hull operator h and vector lattice H with hH=H. Among others, we obtain answers for c=g (the Gleason covering operator), c=qF (the quasi-F covering operator), h = u (the uniform completion operator), and h=e (the essential completion operator).
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