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Various forms of infinity for finitely supported structures
Archive for Mathematical Logic 61 (1):173-222 (2021)
Abstract
The goal of this paper is to define and study the notion of infinity in the framework of finitely supported structures, presenting new properties of infinite cardinalities. Some of these properties are extended from the non-atomic Zermelo–Fraenkel set theory to the world of atomic objects with finite support, while other properties are specific to finitely supported structures. We compare alternative definitions for infinity in the world of finitely supported sets, and provide relevant examples of atomic sets which satisfy some forms of infinity, while do not satisfy others. Finally, we provide a characterization of finitely supported countable sets.Other Versions
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Properties of the atoms in finitely supported structures.Andrei Alexandru & Gabriel Ciobanu - 2020 - Archive for Mathematical Logic 59 (1-2):229-256.
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