Authors:

Daniele Mundici ⁰

Daniele Mundici
1. Department of Mathematics and Computer Science “U. Dini”, University of Florence, Italy
View author publications

You can also search for this author in PubMed Google Scholar

Mathematical logic
Mathematical minimal
Includes supplementary material: sn.pub/extras

Part of the book series: UNITEXT (UNITEXT)

Part of the book sub series: La Matematica per il 3+2 (UNITEXTMAT)

47k Accesses
2 Citations

Buy it now

eBook USD 39.99

Price excludes VAT (USA)

Softcover Book USD 54.99

Price excludes VAT (USA)

Tax calculation will be finalised at checkout

Other ways to access

Licence this eBook for your library

Learn about institutional subscriptions

This is a preview of subscription content, log in via an institution to check for access.

Table of contents (17 chapters)

Front Matter

Pages I-XI

PDF
Propositional Logic
1. Front Matter
  
  Pages 1-1
  
  PDF
2. Introduction
  
  Daniele Mundici
  
  Pages 3-6
3. Fundamental Logical Notions
  
  Daniele Mundici
  
  Pages 7-11
4. The Resolution Method
  
  Daniele Mundici
  
  Pages 13-17
5. Robinson’s Completeness Theorem
  
  Daniele Mundici
  
  Pages 19-26
6. Fast Classes for DPP
  
  Daniele Mundici
  
  Pages 27-30
7. Gödel’s Compactness Theorem
  
  Daniele Mundici
  
  Pages 31-34
8. Propositional Logic: Syntax
  
  Daniele Mundici
  
  Pages 35-39
9. Propositional Logic: Semantics
  
  Daniele Mundici
  
  Pages 41-46
10. Normal Forms
  
  Daniele Mundici
  
  Pages 47-51
11. Recap: Expressivity and Efficiency
  
  Daniele Mundici
  
  Pages 53-54
Predicate Logic
1. Front Matter
  
  Pages 55-55
  
  PDF
2. The Quantifiers “There Exists” and “For All”
  
  Daniele Mundici
  
  Pages 57-61
3. Syntax of Predicate Logic
  
  Daniele Mundici
  
  Pages 63-69
4. The Meaning of Clauses
  
  Daniele Mundici
  
  Pages 71-78
5. Gödel’s Completeness Theorem for the Logic of Clauses
  
  Daniele Mundici
  
  Pages 79-88
6. Equality Axioms
  
  Daniele Mundici
  
  Pages 89-93
7. The Predicate Logic L
  
  Daniele Mundici
  
  Pages 95-116
8. Final Remarks
  
  Daniele Mundici
  
  Pages 117-120

About this book

This short book, geared towards undergraduate students of computer science and mathematics, is specifically designed for a first course in mathematical logic. A proof of Gödel's completeness theorem and its main consequences is given using Robinson's completeness theorem and Gödel's compactness theorem for propositional logic. The reader will familiarize himself with many basic ideas and artifacts of mathematical logic: a non-ambiguous syntax, logical equivalence and consequence relation, the Davis-Putnam procedure, Tarski semantics, Herbrand models, the axioms of identity, Skolem normal forms, nonstandard models and, interestingly enough, proofs and refutations viewed as graphic objects. The mathematical prerequisites are minimal: the book is accessible to anybody having some familiarity with proofs by induction. Many exercises on the relationship between natural language and formal proofs make the book also interesting to a wide range of students of philosophy and linguistics.

Reviews

From the reviews:

“This is a short introduction to mathematical logic that covers basic material in 17 chapters … . The book is interspersed with several small references to various scholars involved in the development of logic, which provides for welcome interruptions in the formal exposition. … An important aspect of the book is a veritable multitude of exercises. … it is a very nice booklet that in view of this reviewer is an attractive choice for an introductory logic course for first year computer science students.” (Krzysztof R. Apt, Theory and Practice of Logic Programming, Vol. 12 (3), 2012)

“The book contains all the necessary means to understand any advanced text in logic, including the subjects covering Gödel’s incompleteness theorems. Although brief, this course seems to be an excellent introduction to modern mathematical logic, and, as such, we recommend it firstly to students of mathematics and computer science, and also to students of philosophy and linguistics … . The author’s beautiful, clear and approachable style makes this book also recommendable to a broader range of readers who are interested in modern trends in logic.” (Branislav Boričić, Zentralblatt MATH, Vol. 1235, 2012)

Authors and Affiliations

Department of Mathematics and Computer Science “U. Dini”, University of Florence, Italy

Daniele Mundici

Bibliographic Information

Book Title: Logic: a Brief Course
Authors: Daniele Mundici
Series Title: UNITEXT
DOI: https://doi.org/10.1007/978-88-470-2361-1
Publisher: Springer Milano
eBook Packages: Mathematics and Statistics, Mathematics and Statistics (R0)
Softcover ISBN: 978-88-470-2360-4Published: 02 February 2012
eBook ISBN: 978-88-470-2361-1Published: 29 March 2012
Series ISSN: 2038-5714
Series E-ISSN: 2532-3318
Edition Number: 1
Number of Pages: XI, 130
Topics: Mathematical Logic and Foundations, Mathematical Logic and Formal Languages, Semantics

Publish with us

Policies and ethics

Authors:

Sections

Buy it now

Buying options

Other ways to access

Table of contents (17 chapters)

Front Matter

Propositional Logic

Front Matter

Predicate Logic

Front Matter

About this book

Reviews

Authors and Affiliations

Department of Mathematics and Computer Science “U. Dini”, University of Florence, Italy

Bibliographic Information

Publish with us

Buy it now

Buying options

Other ways to access

Search

Navigation