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Gödel's Theorem: A Very Short Introduction [#718]
Gödel's Theorem: A Very Short Introduction [#718]

Gödel's Theorem: A Very Short Introduction [#718]

Author: 
A. W. Moore
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  • Places Gödel's famous theorem in its intellectual and historical context, while explaining the key concepts
  • Gives two proofs of the theorem
  • Considers common misunderstandings associated with the theorem
  • Discusses the theorem's most important philosophical implications

    
Kurt Gödel first published his celebrated theorem, showing that no axiomatization can determine the whole truth and nothing but the truth concerning arithmetic, nearly a century ago. The theorem challenged prevalent presuppositions about the nature of mathematics and was consequently of considerable mathematical interest, while also raising various deep philosophical questions. Gödel's Theorem has since established itself as a landmark intellectual achievement, having a profound impact on today's mathematical ideas. Gödel and his theorem have attracted something of a cult following, though his theorem is often misunderstood.

This Very Short Introduction places the theorem in its intellectual and historical context, and explains the key concepts as well as common misunderstandings of what it actually states. Adrian Moore provides a clear statement of the theorem, presenting two proofs, each of which has something distinctive to teach about its content. Moore also discusses the most important philosophical implications of the theorem. In particular, Moore addresses the famous question of whether the theorem shows the human mind to have mathematical powers beyond those of any possible computer

Index: 

1: Introduction
2: The appeal and demands of axiomatization
3: Historical background
4: The key concepts involved in Gödel's theorem
5: The diagonal proof of Gödel's theorem
6: A second proof of Gödel's theorem, and a proof of Gödel's second theorem
7: Hilbert's programme, the human mind, and computers
8: Making sense in and of mathematics

About the author: 

A. W. Moore, Tutorial Fellow at St Hugh's College, and Professor of Philosophy at the University of Oxford

A.W. Moore is Professor of Philosophy at the University of Oxford and Tutorial Fellow in Philosophy at St Hugh's College, Oxford. He has held teaching and research positions at University College, Oxford, and King's College, Cambridge. He is joint editor, with Lucy O'Brien, of the journal Mind. In 2016 he wrote and presented the series A History of the Infinite on BBC Radio 4.

Product details

ISBN : 9780192847850

Author: 
A. W. Moore
Pages
144 Pages
Format
Paperback
Size
111 x 174 mm
Pub date
Nov 2022
Series
Very Short Introductions
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Gödel's Theorem: A Very Short Introduction [#718]

Gödel's Theorem: A Very Short Introduction [#718]

Gödel's Theorem: A Very Short Introduction [#718]