Gödel’s Philosophical Challenge

Studia Semiotyczne 34 (1):57-80 (2020)
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Abstract

The incompleteness theorems constitute the mathematical core of Gödel’s philosophical challenge. They are given in their “most satisfactory form”, as Gödel saw it, when the formality of theories to which they apply is characterized via Turing machines. These machines codify human mechanical procedures that can be carried out without appealing to higher cognitive capacities. The question naturally arises, whether the theorems justify the claim that the human mind has mathematical abilities that are not shared by any machine. Turing admits that non-mechanical steps of intuition are needed to transcend particular formal theories. Thus, there is a substantive point in comparing Turing’s views with Gödel’s that is expressed by the assertion, “The human mind infinitely surpasses any finite machine”. The parallelisms and tensions between their views are taken as an inspiration for beginning to explore, computationally, the capacities of the human mathematical mind.

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10.26333/sts.xxxiv1.03

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Wilfried Sieg
Carnegie Mellon University

Citations of this work

Diagonal Anti-Mechanist Arguments.David Kashtan - 2020 - Studia Semiotyczne 34 (1):203-232.
Pasch's empiricism as methodological structuralism.Dirk Schlimm - 2020 - In Erich H. Reck & Georg Schiemer (eds.), The Pre-History of Mathematical Structuralism. Oxford: Oxford University Press. pp. 80-105.
Péter on Church's Thesis, Constructivity and Computers.Mate Szabo - 2021 - In Liesbeth De Mol, Andreas Weiermann, Florin Manea & David Fernández-Duque (eds.), Connecting with Computability. Proceedings of Computability in Europe. pp. 434-445.

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References found in this work

On Computable Numbers, with an Application to the Entscheidungsproblem.Alan Turing - 1936 - Proceedings of the London Mathematical Society 42 (1):230-265.
Computing Machinery and Intelligence.Alan M. Turing - 2003 - In John Heil (ed.), Philosophy of Mind: A Guide and Anthology. New York: Oxford University Press.
Systems of logic based on ordinals..Alan Turing - 1939 - London,: Printed by C.F. Hodgson & son.

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