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| Introduction Part A. The Fundamental Concepts of Recursion Theory Chapter Ⅰ. Recursive Functions 1. An Informal Description 2. Formal Definitions of Computable Functions 2.1. Primitive Recursive Functions 2.2. Diagonalization and Partial Recursive Functions 2.3. Turing Computable Functions 3. The Basic Results 4. Recursively Enumerable Sets and Unsolvable Problems 5. Recursive Permutations and Myhills Isomorphism Theorem Chapter Ⅱ. Fundamentals of Recursively Enumerable Sets and the Recursion Theorem 1. Equivalent Definitions of Recursively Enumerable Sets andTheir Basic Properties 2. Uniformity and Indices for Recursive and Finite Sets 3. The Recursion Theorem 4. Complete Sets, Productive Sets, and Creative Sets Chapter Ⅲ. Turing Reducibility and the Jump Operator 1. Definitions of Relative Computability 2. Turing Degrees and the Jump Operator 3. The Modulus Lemma and Limit Lemma Chapter Ⅳ. The Arithmetical Hierarchy 1. Computing Levels in the Arithmetical Hierarchy 2. Posts Theorem and the Hierarchy Theorem 3. En-Complete Sets 4. The Relativized Arithmetical Hierarchy and High and Low Degrees Part B. Posts Problem, Oracle Constructions and the Finite Injury Priority Method Chapter Ⅴ. Simple Sets and Posts Problem 1. Immune Sets, Simple Sets and Posts Construction 2. Hypersimple Sets and Majorizing Functions 3. The Permitting Method 4. Effectively Simple Sets Are Complete 5. A Completeness Criterion for R.E. Sets Chapter Ⅵ. Oracle Constructions of Non-R.E. Degrees 1. A Pair of Incomparable Degrees Below 0 2. Avoiding Cones of Degrees 3. Inverting the Jump 4. Upper and Lower Bounds for Degrees 5.* Minimal Degrees Chapter Ⅶ. The Finite Injury Priority Method 1. Low Simple Sets 2. The Original Friedberg-Muchnik Theorem 3. SplittingTheorems Part C. Infinitary Methods for Constructing R.E. Sets and Degrees Chapter Ⅷ.The Infinite Injury Priority Method 1. The Obstacles in Infinite Injury and the Thickness Lemma 2. The Injury and Window Lemmas and the Strong Thickness Lemma 3. TheJump Theorem 4. The Density Theorem and the Sacks Coding Strategy 5.*The Pinball Machine Model for Infinite Injury Chapter Ⅸ. The Minimal Pair Method and Embedding Lattices into the R.E. Degrees 1. Minimal Pairs and Embedding the Diamond Lattice 2.* Embedding DistributiveLattices 3. The Non-Diamond Theorem 4.* Nonbranching Degrees 5.*Noncappable Degrees Chapter Ⅹ. The Lattice of R.E. Sets Under Inclusion …… Part D. Advanced Topics and Current Research Areas in the R.E.Degrees and the Lattice References Notation Index SubjectIndex |
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