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Computability and Complexity Theory

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This revised and extensively expanded edition of Computability and Complexity Theory comprises essential materials that are core knowledge in the theory of computation. The book is self-contained, with a preliminary chapter describing key mathematical concepts and notations. Subsequent chapters move from the qualitative aspects of classical computability theory to the quantitative aspects of complexity theory. Dedicated chapters on undecidability, NP-completeness, and relative computability focus on the limitations of computability and the distinctions between feasible and intractable. Substantial new content in this edition includes:

  • a chapter on nonuniformity studying Boolean circuits, advice classes and the important result of Karp─Lipton.
  • a chapter studying properties of the fundamental probabilistic complexity classes
  • a study of the alternating Turing machine and uniform circuit classes.
  • an introduction of counting classes, proving the famous results of Valiant and Vazirani and of Toda
  • a thorough treatment of the proof that IP is identical to PSPACE

With its accessibility and well-devised organization, this text/reference is an excellent resource and guide for those looking to develop a solid grounding in the theory of computing. Beginning graduates, advanced undergraduates, and professionals involved in theoretical computer science, complexity theory, and computability will find the book an essential and practical learning tool.

Topics and features:

  • Concise, focused materials cover the most fundamental concepts and results in the field of modern complexity theory, including the theory of NP-completeness, NP-hardness, the polynomial hierarchy, and complete problems for other complexity classes
  • Contains information that otherwise exists only in research literature and presents it in a unified, simplified manner
  • Provides key mathematical background information, including sections on logic and number theory and algebra
  • Supported by numerous exercises and supplementary problems for reinforcement and self-study purposes

Author(s): Steven Homer, Alan L. Selman (auth.)
Series: Texts in Computer Science
Edition: 2nd
Publisher: Springer US
Year: 2011

Language: English
Pages: 315
Tags: Theory of Computation; Algorithm Analysis and Problem Complexity

Front Matter....Pages i-xvi
Preliminaries....Pages 1-21
Introduction to Computability....Pages 23-40
Undecidability....Pages 41-73
Introduction to Complexity Theory....Pages 75-80
Basic Results of Complexity Theory....Pages 81-122
Nondeterminism and NP-Completeness....Pages 123-144
Relative Computability....Pages 145-179
Nonuniform Complexity....Pages 181-199
Parallelism....Pages 201-223
Probabilistic Complexity Classes....Pages 225-246
Introduction to Counting Classes....Pages 247-260
Interactive Proof Systems....Pages 261-282
Back Matter....Pages 283-298