Completeness for systems including real numbers

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Studia Logica 48 (1):67 - 75 (1989)
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Abstract

The usual completeness theorem for first-order logic is extended in order to allow for a natural incorporation of real analysis. Essentially, this is achieved by building in the set of real numbers into the structures for the language, and by adjusting other semantical notions accordingly. We use many-sorted languages so that the resulting formal systems are general enough for axiomatic treatments of empirical theories without recourse to elements of set theory which are difficult to interprete empirically. Thus we provide a way of applying model theory to empirical theories without tricky detours. Our frame is applied to axiomatizations of three empirical theories: classical mechanics, phenomenological thermodynamics, and exchange economics

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10.1007/bf00370634

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Citations of this work

Normische gesetzeshypothesen und die wissenschaftsphilosophische bedeutung Des nichtmonotonen schliessens.Gerhard Schurz - 2001 - Journal for General Philosophy of Science / Zeitschrift für Allgemeine Wissenschaftstheorie 32 (1):65-107.

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References found in this work

Deterministic theories.Richard Montague - 1974 - In Richmond H. Thomason (ed.), Formal Philosophy. Yale University Press.
Stegmüller on Kuhn and incommensurability.David Pearce - 1982 - British Journal for the Philosophy of Science 33 (4):389-396.
Incommensurability, reduction, and translation.W. Balzer - 1985 - Erkenntnis 23 (3):255 - 267.
The proper reconstruction of exchange economics.W. Balzer - 1985 - Erkenntnis 23 (2):185 - 200.

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