A General Extension Theorem for Directed-Complete Partial Orders
A General Extension Theorem for Directed-Complete Partial Orders
Author(s): Peter Schuster, Daniel WesselSubject(s): Economy
Published by: Wydawnictwo Uniwersytetu Jagiellońskiego
Keywords: Extension theorems; Kuratowski-Zorn lemma; transfinite methods
Summary/Abstract: The typical indirect proof of an abstract extension theorem, by the Kuratowski-Zorn lemma, is based on a one-step extension argument. While Bell has observed this in case of the axiom of choice, for subfunctions of a given relation, we now consider such extension patterns on arbitrary directedcomplete partial orders. By postulating the existence of so-called total elements rather than maximal ones, we can single out an immediate consequence of the Kuratowski-Zorn lemma from which quite a few abstract extension theorems can be deduced more directly, apart from certain de nitions by cases. Applications include Baer's criterion for a module to be injective. Last but not least, our general extension theorem is equivalent to a suitable form of the Kuratowski-Zorn lemma over constructive set theory.
Journal: Reports on Mathematical Logic
- Issue Year: 2018
- Issue No: 53
- Page Range: 79-96
- Page Count: 18
- Language: English
