There's Something About Gödel The Complete Guide to the Incompleteness Theorem
by Berto, FrancescoEdition: 1st
Format: Paperback
Pub. Date: 2009-11-09
Publisher(s): Wiley-Blackwell
Other versions by this Author
List Price: $35.78
Buy New
Usually Ships in 8 - 10 Business Days.
$34.08
Rent Textbook
Select for Price
Used Textbook
We're Sorry
Sold Out
eTextbook
We're Sorry
Not Available
How Marketplace Works:
- This item is offered by an independent seller and not shipped from our warehouse
- Item details like edition and cover design may differ from our description; see seller's comments before ordering.
- Sellers much confirm and ship within two business days; otherwise, the order will be cancelled and refunded.
- Marketplace purchases cannot be returned to eCampus.com. Contact the seller directly for inquiries; if no response within two days, contact customer service.
- Additional shipping costs apply to Marketplace purchases. Review shipping costs at checkout.
Summary
Berto's highly readable and lucid guide introduces students and the interested reader to Godel's celebrated Incompleteness Theorem, and discusses some of the most famous - and infamous - claims arising from Godel's arguments. Offers a clear understanding of this difficult subject by presenting each of the key steps of the Theorem in separate chapters Discusses interpretations of the Theorem made by celebrated contemporary thinkers Sheds light on the wider extra-mathematical and philosophical implications of Godel's theories Written in an accessible, non-technical style
Author Biography
Francesco Berto, Ph.D., is a lecturer in Philosophy at the University Venice - Ca'Foscari, Italy, and is a Chaire d'Excellence Fellow at the École Normale Supérieure (Sorbonne), Paris. He has written numerous articles on logic, metaphysics and philosophy of language. He is the author of How to Sell a Contradiction: The Logic and Metaphysics of Inconsistency (2005), for which he won the Castiglioncello prize for the best philosophical book by a young philosopher in 2007.
Table of Contents
| Prologue | p. xi |
| Acknowledgments | p. xix |
| The Gödelian Symphony | p. 1 |
| Foundations and Paradoxes | p. 3 |
| "This sentence is false" | p. 6 |
| The Liar and Gödel | p. 8 |
| Language and metalanguage | p. 10 |
| The axiomatic method, or how to get the non-obvious out of the obvious | p. 13 |
| Peano's axioms... | p. 14 |
| ...and the unsatisfied logicists, Frege and Russell | p. 15 |
| Bits of set theory | p. 17 |
| The Abstraction Principle | p. 20 |
| Bytes of set theory | p. 21 |
| Properties, relations, functions, that is, sets again | p. 22 |
| Calculating, computing, enumerating, that is, the notion of algorithm | p. 25 |
| Taking numbers as sets of sets | p. 29 |
| It's raining paradoxes | p. 30 |
| Cantor's diagonal argument | p. 32 |
| Self-reference and paradoxes | p. 36 |
| Hilbert | p. 39 |
| Strings of symbols | p. 39 |
| "...in mathematics there is no ignorabimus" | p. 42 |
| Gödel on stage | p. 46 |
| Our first encounter with the Incompleteness Theorem... | p. 47 |
| ...and some provisos | p. 51 |
| Gödelization, or Say It with Numbers! | p. 54 |
| TNT | p. 55 |
| The arithmetical axioms of TNT and the "standard model" N | p. 57 |
| The Fundamental Property of formal systems | p. 61 |
| The Gödel numbering... | p. 65 |
| ...and the arithmetization of syntax | p. 69 |
| Bits of Recursive Arithmetic... | p. 71 |
| Making algorithms precise | p. 71 |
| Bits of recursion theory | p. 72 |
| Church's Thesis | p. 76 |
| The recursiveness of predicates, sets, properties, and relations | p. 77 |
| ...And How It Is Represented in Typographical Number Theory | p. 79 |
| Introspection and representation | p. 79 |
| The representability of properties, relations, and functions... | p. 81 |
| ...and the Gödelian loop | p. 84 |
| "I Am Not Provable" | p. 86 |
| Proof pairs | p. 86 |
| The property of being a theorem of TNT (is not recursive!) | p. 87 |
| Arithmetizing substitution | p. 89 |
| How can a TNT sentence refer to itself? | p. 90 |
| ¿ | p. 93 |
| Fixed point | p. 95 |
| Consistency and omega-consistency | p. 97 |
| Proving G1 | p. 98 |
| Rosser's proof | p. 100 |
| The Unprovability of Consistency and the "Immediate Consequences" of G1 and G2 | p. 102 |
| G2 | p. 102 |
| Technical interlude | p. 105 |
| "Immediate consequences" of G1 and G2 | p. 106 |
| Undecidable1 and undecidable2 | p. 107 |
| Essential incompleteness, or the syndicate of mathematicians | p. 109 |
| Robinson Arithmetic | p. 111 |
| How general are Gödel's results? | p. 112 |
| Bits of Turing machine | p. 113 |
| Gl and G2 in general | p. 116 |
| Unexpected fish in the formal net | p. 118 |
| Supernatural numbers | p. 121 |
| The culpability of the induction scheme | p. 123 |
| Bits of truth (not too much of it, though) | p. 125 |
| The World after Gödel | p. 129 |
| Bourgeois Mathematicians! The Postmodern Interpretations | p. 131 |
| What is postmodernism? | p. 132 |
| From Gödel to Lenin | p. 133 |
| Is "Biblical proof" decidable? | p. 135 |
| Speaking of the totality | p. 137 |
| Bourgeois teachers! | p. 139 |
| (Un)interesting bifurcations | p. 141 |
| A Footnote to Plato | p. 146 |
| Explorers in the realm of numbers | p. 146 |
| The essence of a life | p. 148 |
| "The philosophical prejudices of our times" | p. 151 |
| From Gödel toTarski | p. 153 |
| Human, too human | p. 157 |
| Mathematical Faith | p. 162 |
| "I'm not crazy!" | p. 163 |
| Qualified doubts | p. 166 |
| From Gentzen to the Dialectica interpretation | p. 168 |
| Mathematicians are people of faith | p. 170 |
| Mind versus Computer: Gödel and Artificial Intelligence | p. 174 |
| Is mind (just) a program? | p. 174 |
| "Seeing the truth" and "going outside the system" | p. 176 |
| The basic mistake | p. 179 |
| In the haze of the transfinite | p. 181 |
| "Know thyself": Socrates and the inexhaustibility of mathematics | p. 185 |
| Gödel versus Wittgenstein and the Paraconsistent Interpretation | p. 189 |
| "When geniuses meet... | p. 190 |
| The implausible Wittgenstein | p. 191 |
| "There is no metamathematics" | p. 194 |
| Proof and prose | p. 196 |
| The single argument | p. 201 |
| But how can arithmetic be inconsistent? | p. 206 |
| The costs and benefits of making Wittgenstein plausible | p. 213 |
| Epilogue | p. 214 |
| References | p. 217 |
| Index | p. 225 |
| Table of Contents provided by Ingram. All Rights Reserved. |
An electronic version of this book is available through VitalSource.
This book is viewable on PC, Mac, iPhone, iPad, iPod Touch, and most smartphones.
By purchasing, you will be able to view this book online, as well as download it, for the chosen number of days.
Digital License
You are licensing a digital product for a set duration. Durations are set forth in the product description, with "Lifetime" typically meaning five (5) years of online access and permanent download to a supported device. All licenses are non-transferable.
More details can be found here.
A downloadable version of this book is available through the eCampus Reader or compatible Adobe readers.
Applications are available on iOS, Android, PC, Mac, and Windows Mobile platforms.
Please view the compatibility matrix prior to purchase.