1: Recursive Enumerability and Recursivity
2: Undecidability and Recursive Inseparability
3: Indexing
4: Generative Sets and Creative Systems
5: Double Generativity and Complete Effective Inseparability
6: Universal and Doubly Universal Systems
7: Shepherdson Revisited
8: Recursion Theorems
9: Symmetric and Double Recursion Theorems
10: Productivity and Double Productivity
11: Three Special Topics
12: Uniform Godelization
"A self-contained exposition, it presumes neither a reading of the
previous volume . . . nor a prior knowledge of recursion theory.
The reader with some familiarity with both recursion theory and
logic should find this an excellent source for the interconnections
between them." --Choice
"Smullyan is not only an outstanding authority on this subject, but
is also a skilled pedagogue, with a special talent for formulating
simple riddles, which illuminate this very difficult and profound
subject. Smullyan has made an important contribution toward the
wider understanding of the work of Godel and his followers. . . .
Smullyan plays a significant role in the further development of
mathematical logic and the elucidation of its relation to
metamathematics. He continues to be one of the foremost
popularizers of the subject." --American Scientist
". . . an interesting presentation of recursion theory from the
point of view of its applications in metamathematics, indicating
many interrelations between various notions and properties. It will
certainly be studied carefully and referred to by students and
specialists alike." --Roman Murawski, Mathematical Reviews
"A self-contained exposition, it presumes neither a reading of the
previous volume . . . nor a prior knowledge of recursion theory.
The reader with some familiarity with both recursion theory and
logic should find this an excellent source for the interconnections
between them." --Choice
"Smullyan is not only an outstanding authority on this subject, but
is also a skilled pedagogue, with a special talent for formulating
simple riddles, which illuminate this very difficult and profound
subject. Smullyan has made an important contribution toward the
wider understanding of the work of Godel and his followers. . . .
Smullyan plays a significant role in the further development of
mathematical logic and the elucidation of its relation to
metamathematics. He continues to be one of the foremost
popularizers of the subject." --American Scientist
". . . an interesting presentation of recursion theory from the
point of view of its applications in metamathematics, indicating
many interrelations between various notions and properties. It will
certainly be studied carefully and referred to by students and
specialists alike." --Roman Murawski, Mathematical Reviews
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