The Fraenkel‐Carnap question for Dedekind algebras

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Mathematical Logic Quarterly 49 (1):92-96 (2003)
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Abstract

It is shown that the second-order theory of a Dedekind algebra is categorical if it is finitely axiomatizable. This provides a partial answer to an old and neglected question of Fraenkel and Carnap: whether every finitely axiomatizable semantically complete second-order theory is categorical. It follows that the second-order theory of a Dedekind algebra is finitely axiomatizable iff the algebra is finitely characterizable. It is also shown that the second-order theory of a Dedekind algebra is quasi-finitely axiomatizable iff the algebra is quasi-finitely characterizable

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10.1002/malq.200310008

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Ben George
University of Arizona

Citations of this work

Fraenkel-Carnap properties.G. Au George Weaver - 2005 - Mathematical Logic Quarterly 51 (3):285.
From finitary to infinitary second‐order logic.George Weaver & Irena Penev - 2005 - Mathematical Logic Quarterly 51 (5):499-506.

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Homogeneous and universal dedekind algebras.George Weaver - 2000 - Studia Logica 64 (2):173-192.

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