Computability Theory (Chapman Hall/CRC Mathematics Series) [Hardcover]

S. Barry Cooper (Author)

Book Description

ISBN-10: 1584882379 | ISBN-13: 978-1584882374 | Publication Date: November 17, 2003 | Edition: 1

Computability theory originated with the seminal work of Gödel, Church, Turing, Kleene and Post in the 1930s. This theory includes a wide spectrum of topics, such as the theory of reducibilities and their degree structures, computably enumerable sets and their automorphisms, and subrecursive hierarchy classifications. Recent work in computability theory has focused on Turing definability and promises to have far-reaching mathematical, scientific, and philosophical consequences.

Written by a leading researcher, Computability Theory provides a concise, comprehensive, and authoritative introduction to contemporary computability theory, techniques, and results. The basic concepts and techniques of computability theory are placed in their historical, philosophical and logical context. This presentation is characterized by an unusual breadth of coverage and the inclusion of advanced topics not to be found elsewhere in the literature at this level.

The book includes both the standard material for a first course in computability and more advanced looks at degree structures, forcing, priority methods, and determinacy. The final chapter explores a variety of computability applications to mathematics and science.

Computability Theory is an invaluable text, reference, and guide to the direction of current research in the field. Nowhere else will you find the techniques and results of this beautiful and basic subject brought alive in such an approachable and lively way.

Editorial Reviews

About the Author

S. Barry Cooper is a professor in the Department of Pure Mathematics at the University of Leeds, UK.

--This text refers to an alternate Hardcover edition.

Product Details

• Hardcover: 424 pages
• Publisher: Chapman and Hall/CRC; 1 edition (November 17, 2003)
• Language: English
• ISBN-10: 1584882379
• ISBN-13: 978-1584882374
• Product Dimensions: 9.7 x 6.2 x 1.1 inches
• Shipping Weight: 1.6 pounds (View shipping rates and policies)
• Average Customer Review: 4.5 out of 5 stars  See all reviews (4 customer reviews)
• Amazon Best Sellers Rank: #1,556,218 in Books (See Top 100 in Books)

Customer Reviews

Most Helpful Customer Reviews

11 of 11 people found the following review helpful:

5.0 out of 5 stars A Unique Introduction to Computability, March 28, 2004

By 

G Barmpalias (West Yorkshire, U.K.) - See all my reviews

This review is from: Computability Theory (Chapman Hall/CRC Mathematics Series) (Hardcover)

This book is an introduction to computability theory. It is organized in three parts, starting with basic computability theory and moving up to advanced topics, some of which cannot be found in textbooks today.

In the first part the reader is introduced to basic concepts and results of computability like models of computation, coding, universal machines, enumerability, fixed point theorem. The author also discusses the historical context in which various notions appeared (not only in this part but throughout the book) like Hilbert's programme and makes connections with logic (language, theories, Peano Arithmetic, Godel incompleteness theorem). Computability and Unsolvability in the real world is also discussed, along with the search for natural examples of incomputable sets, a topic which is currently more interesting than ever. Most of the content of Part I can be found in other good text books (like Odiffreddi's or Roger's) but the way it is presented is unique: the arguments and proofs are given in an informal yet accurate way (according to the modern mode for doing computability) and the whole arrangement is very schematic, often assisted by diagrams, figures, tables and boxes. This is especially helpful in a text book in computability theory, a subject that makes understanding rely so much on intuition and visual images.

The second part is concerned with oracle computation (a core part of computability), Turing degrees, Enumeration degrees, and many other related and complementary topics like polynomial bounds, P=?NP, the Scott model for Lamda calculus and others. The author here tries to give a general idea of the subject by discussing interesting topics (like the ones mentioned above) which don¡¯t necessarily lie on the core of computability theory. This is pretty much the spirit of the whole book: to give the non-expert reader access to the most exciting (and sometimes apparently inaccessible at this level) topics in the subject and motivate him/her to further study towards the direction that looks and feels more appealing.

The third and last part discusses advanced topics like approximation constructions, priority injury, Sack¡¯s theorems, maximal sets, even the 0¡¯¡¯¡¯-priority method. This is the longest part of the book and the choice its contents (along with the approachable and attractive way they are presented despite their advanced nature) is just another feature which makes this book unique. The construction of maximal sets is remarkable since it uses a tree argument (with infinitary activity of the nodes but without injury) thus making it more intuitive and understandable, in contrast to the usual e-maximal state method which was introduced by the original paper (with the first proof that maximal sets exist) and followed by most text books I am aware of, without many changes. The proof of the existence of a noncuppable c.e. noncomputable degree also deserves to be mentioned as it is not something that one finds in text books. Also, it is different than the original pinball argument one finds in papers (with the restraints tending to infinity, often mentioned as an example of this bizarre feature) as it is done on a tree. Finally, computability in mathematics (structures, combinatorics, Analysis) and science is discussed along with randomness and computable models.

In the end of the book there is a bibliography for further reading. This is very personal (and, of course, by no means complete) but very helpful as it ranges over a wide range of computability related topics and it matches the spirit of the book very well.

To sum up, this introduction achieves the aims set by the author (a leading specialist in computability) in the preface and the epilogue: it deals with the subject in a very wide context, discusses it from its most hardcore features (priority, forcing) to its most distant echoes (incomputability in science) and most importantly it relates these two, showing how technical work is motivated and inspired by more general concerns. It is intended as a text book for undergraduate and early postgraduate students but is also suitable for any non-specialist. The features discussed above along with the modern style of presentation make the subject look as attractive as it really is and the book unique over the other computability text books available today. I wish this book had been in my library when I first started reading computability.

8 of 9 people found the following review helpful:

5.0 out of 5 stars Clear explanations and fresh approach that enables real understanding, July 22, 2005

By 

Dexter - See all my reviews

This review is from: Computability Theory (Chapman Hall/CRC Mathematics Series) (Hardcover)

This is a lovely book, which gives a fresh and invigorating account of current developments in computability theory. Personally, I don't feel it can helpfully be compared to Cutland's computability text, as though that book supplies enough background for some undergraduate introductory courses in computability theory, it doesn't reach beyond that level. Cooper sensibly avoids using the same approach as Cutland for the area of over-lap -there would be little point duplicating an existing, in-print work- instead, he has in the early chapters given an intuitive approach to those topics which helps the reader understand what is going on under the morass of symbols which so often obscure rather than promote comprehension. Nor can much useful comparison be drawn with Hartley Roger's classic text, as the main bulk of Cooper's book is concerned with material which post-dates Hartley Rogers.

Computability theory has a fearsome reputation for incomprehensibility and difficulty, even amongst logicians. When, many years ago, I attended my first logic conference and was asked my area of study by a senior logician, I was a little disconcerted by his response of, `Good luck - you'll need it,' to my reply of `computability theory'. Conversations with Cooper proved invaluable, in that his understanding is holistic: he understands what is going on, he understands the big picture. Better, he can draw pictures, both literal and figurative, to explain to others how particular proofs work.

That is what you get with this book: a minimum of technical jargon and deceptively clear explanations of many modern developments in computability theory. It's a great book for anyone beginning research in the area, or for an undergraduate who wants a deeper understanding to underpin their coursework, or, indeed, for researchers in other areas wanting to find out more about modern computability theory and its relevance to their work.

14 of 19 people found the following review helpful:

3.0 out of 5 stars Not recommended as a starting point, April 28, 2005

By 

Todd Ebert (Long Beach California) - See all my reviews

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This review is from: Computability Theory (Chapman Hall/CRC Mathematics Series) (Hardcover)

The book is divided into roughly three parts: an introduction to computability theory, followed by a more advanced introduction to the theory of degrees of unsolvability and decidable theories, and finally some newer material on computation and structure.

As for the introduction to computability, let me just say that I'm thankful to have already been introduced to computability via Nigel Cutland's excellent and concise text "Computability : An Introduction to Recursive Function Theory". Unlike this book, Cutland does not skip any of the important details (or have the reader fill them in with exercises). For example, Cutland acutally provides rigorous but intuitive proofs of the s-m-n Theorem and the existence of universal computers. Contrast this with how this book leaves the general theorem as an exercise, follwed by the sentence "But let us get back to more important matters". What I found remarkable when reading Cutland is that because of the s-m-n (which is trivialized in this book), Cutland rarely invoked "Church's Thesis" when proving the computability of a function or relation, where as Church's Thesis gets invoked in this book for matters as trivial as showing that computable relations are closed under the various logical operations. In short, by reading Chapters 1-11 of Cutland, the reader can easily (and thankfully) skip the first 8 or 9 Chapters of this book, while receiving a more complete thoughtful treatment. Yet another reason to read Cutland is his excellent introductions to both recursion theorems, where as in this book the fixed-point theorem receives one page in an awkward location in the book.

As for the remaining parts, I made an honest attempt to read them in hope that the author's informal style of writing might shed light on some of the more complex results about degrees of unsolvability. And to his credit, I found the Chapter on priority and immunity more understandable than say what is presented in Hartley Rogers's classic "Theory of Recursive Functions and Effective Computability".

The following editorial note originally enticed me to buy the book: "The final chapter explores a variety of computability applications to mathematics and science". Unfortunately this chapter seemed overly brief, and left me looking for better references. In short, reading this book did little to enhance my viewpoint towards computability theory. I'm glad the author is excited about the subject and wants to make the material seem more appealing by trying to provide more intuition about the subject matter, but the way that it was carried out simply did not work for me. For the casual reader I recommend Dewdney's "Turing Omnibus", and for the serious reader, the books by Cutland, Oddifredi, and Rogers in that order. I often hear or read the claim that Rogers's book is "outdated", but it still makes for an amazing read, and is in my opinion still the best graduate text on the subject. Note that most of the results in this book can be found in Rogers. And for the programming oriented reader, the book by Neil Jones "Computability and Complexity" ought not to be missed.