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Computability Theory
 
Rebecca Weber Dartmouth College, Hanover, NH
Computability Theory
Softcover ISBN:  978-0-8218-7392-2
Product Code:  STML/62
List Price: $59.00
Individual Price: $47.20
eBook ISBN:  978-0-8218-8543-7
Product Code:  STML/62.E
List Price: $49.00
Individual Price: $39.20
Softcover ISBN:  978-0-8218-7392-2
eBook: ISBN:  978-0-8218-8543-7
Product Code:  STML/62.B
List Price: $108.00 $83.50
Computability Theory
Click above image for expanded view
Computability Theory
Rebecca Weber Dartmouth College, Hanover, NH
Softcover ISBN:  978-0-8218-7392-2
Product Code:  STML/62
List Price: $59.00
Individual Price: $47.20
eBook ISBN:  978-0-8218-8543-7
Product Code:  STML/62.E
List Price: $49.00
Individual Price: $39.20
Softcover ISBN:  978-0-8218-7392-2
eBook ISBN:  978-0-8218-8543-7
Product Code:  STML/62.B
List Price: $108.00 $83.50
  • Book Details
     
     
    Student Mathematical Library
    Volume: 622012; 203 pp
    MSC: Primary 03; Secondary 68

    What can we compute—even with unlimited resources? Is everything within reach? Or are computations necessarily drastically limited, not just in practice, but theoretically? These questions are at the heart of computability theory.

    The goal of this book is to give the reader a firm grounding in the fundamentals of computability theory and an overview of currently active areas of research, such as reverse mathematics and algorithmic randomness. Turing machines and partial recursive functions are explored in detail, and vital tools and concepts including coding, uniformity, and diagonalization are described explicitly. From there the material continues with universal machines, the halting problem, parametrization and the recursion theorem, and thence to computability for sets, enumerability, and Turing reduction and degrees. A few more advanced topics round out the book before the chapter on areas of research. The text is designed to be self-contained, with an entire chapter of preliminary material including relations, recursion, induction, and logical and set notation and operators. That background, along with ample explanation, examples, exercises, and suggestions for further reading, make this book ideal for independent study or courses with few prerequisites.

    Readership

    Undergraduate students interested in computability theory and recursion theory.

  • Table of Contents
     
     
    • Chapters
    • Chapter 1. Introduction
    • Chapter 2. Background
    • Chapter 3. Defining computability
    • Chapter 4. Working with computable functions
    • Chapter 5. Computing and enumerating sets
    • Chapter 6. Turing reduction and Post’s problem
    • Chapter 7. Two hierarchies of sets
    • Chapter 8. Further tools and results
    • Chapter 9. Areas of research
    • Appendix A. Mathematical asides
  • Reviews
     
     
    • This is only a 200 page book, but it covers a wealth of material...[A] clear, concise introduction that would be ideal for a one-term undergraduate course...Recommended.

      CHOICE
    • This short text does an excellent job of covering those topics that should be included in an undergraduate introduction to computability theory... There are both appropriate exercises and enticing doorways to open topics and current research. The exposition is precise, but still conversational. I believe my students will enjoy reading this text.

      Jeffry L. Hirst, Zentralblatt MATH
  • Requests
     
     
    Review Copy – for publishers of book reviews
    Permission – for use of book, eBook, or Journal content
    Accessibility – to request an alternate format of an AMS title
Volume: 622012; 203 pp
MSC: Primary 03; Secondary 68

What can we compute—even with unlimited resources? Is everything within reach? Or are computations necessarily drastically limited, not just in practice, but theoretically? These questions are at the heart of computability theory.

The goal of this book is to give the reader a firm grounding in the fundamentals of computability theory and an overview of currently active areas of research, such as reverse mathematics and algorithmic randomness. Turing machines and partial recursive functions are explored in detail, and vital tools and concepts including coding, uniformity, and diagonalization are described explicitly. From there the material continues with universal machines, the halting problem, parametrization and the recursion theorem, and thence to computability for sets, enumerability, and Turing reduction and degrees. A few more advanced topics round out the book before the chapter on areas of research. The text is designed to be self-contained, with an entire chapter of preliminary material including relations, recursion, induction, and logical and set notation and operators. That background, along with ample explanation, examples, exercises, and suggestions for further reading, make this book ideal for independent study or courses with few prerequisites.

Readership

Undergraduate students interested in computability theory and recursion theory.

  • Chapters
  • Chapter 1. Introduction
  • Chapter 2. Background
  • Chapter 3. Defining computability
  • Chapter 4. Working with computable functions
  • Chapter 5. Computing and enumerating sets
  • Chapter 6. Turing reduction and Post’s problem
  • Chapter 7. Two hierarchies of sets
  • Chapter 8. Further tools and results
  • Chapter 9. Areas of research
  • Appendix A. Mathematical asides
  • This is only a 200 page book, but it covers a wealth of material...[A] clear, concise introduction that would be ideal for a one-term undergraduate course...Recommended.

    CHOICE
  • This short text does an excellent job of covering those topics that should be included in an undergraduate introduction to computability theory... There are both appropriate exercises and enticing doorways to open topics and current research. The exposition is precise, but still conversational. I believe my students will enjoy reading this text.

    Jeffry L. Hirst, Zentralblatt MATH
Review Copy – for publishers of book reviews
Permission – for use of book, eBook, or Journal content
Accessibility – to request an alternate format of an AMS title
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