Pairs, sets and sequences in first-order theories

Archive for Mathematical Logic 47 (4):299-326 (2008)
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Abstract

In this paper we study the idea of theories with containers, like sets, pairs, sequences. We provide a modest framework to study such theories. We prove two concrete results. First, we show that first-order theories of finite signature that have functional non-surjective ordered pairing are definitionally equivalent to extensions in the same language of the basic theory of non-surjective ordered pairing. Second, we show that a first-order theory of finite signature is sequential (is a theory of sequences) iff it is definitionally equivalent to an extension in the same language of a system of weak set theory called WS

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10.1007/s00153-008-0087-1

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Citations of this work

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References found in this work

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Predicative arithmetic.Edward Nelson - 1986 - Princeton, N.J.: Princeton University Press.
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The computational complexity of logical theories.Jeanne Ferrante - 1979 - New York: Springer Verlag. Edited by Charles W. Rackoff.

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