A representation of sup-completion

Achintya Raya Polavarapu, Vladimir G. Troitsky

Published 2023-06-09Version 1

It was showed by Donner in 1982 that every order complete vector lattice $X$ may be embedded into a cone $X^s$, called the sup-completion of $X$. We show that if one represents the universal completion of $X$ as $C^\infty(K)$, then $X^s$ is the set of all continuous functions from $K$ to $[-\infty,\infty]$ that dominate some element of $X$. This provides a functional representation of $X^s$, as well as an easy alternative proof of its existence.