Wittgenstein's ab-Notation: An Iconic Proof Procedure

History and Philosophy of Logic 38 (3):239-262 (2017)
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Abstract

This paper systematically outlines Wittgenstein's ab-notation. The purpose of this notation is to provide a proof procedure in which ordinary logical formulas are converted into ideal symbols that identify the logical properties of the initial formulas. The general ideas underlying this procedure are in opposition to a traditional conception of axiomatic proof and are related to Peirce's iconic logic. Based on Wittgenstein's scanty remarks concerning his ab-notation, which almost all apply to propositional logic, this paper explains how to extend his method to a subset of first-order formulas, namely, formulas that do not contain dyadic sentential connectives within the scope of any quantifier.

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10.1080/01445340.2017.1312222

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Timm Lampert
Humboldt-University, Berlin

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References found in this work

Mathematical logic.Willard Van Orman Quine - 1951 - Cambridge,: Harvard University Press.
Principia Mathematica.A. N. Whitehead & B. Russell - 1927 - Annalen der Philosophie Und Philosophischen Kritik 2 (1):73-75.
A Companion to Wittgenstein’s Tractatus.Max Black - 1964 - Cambridge University Press.
Principia mathematica.A. N. Whitehead & B. Russell - 1910-1913 - Revue de Métaphysique et de Morale 19 (2):19-19.

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