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Automorphisms of the Lattice of Recursively Enumerable Sets

Buch | Softcover

151 Seiten

1995
American Mathematical Society (Verlag)
978-0-8218-2601-0 (ISBN)

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Explores the connection between the lattice of recursively enumerable (r e) sets and the r e Turing degrees. This book presents a degree-theoretic technique for constructing both automorphisms of the lattice of r e sets and isomorphisms between various substructures of the lattice.

This work explores the connection between the lattice of recursively enumerable (r.e.) sets and the r.e. Turing degrees. Cholak presents a degree-theoretic technique for constructing both automorphisms of the lattice of r.e. sets and isomorphisms between various substructures of the lattice. In addition to providing another proof of Soare's Extension Theorem, this technique is used to prove a collection of new results, including: every non recursive r.e. set is automorphic to a high r.e. set; and for every non recursive r.e. set $A$ and for every high r.e. degree h there is an r.e. set $B$ in h such that $A$ and $B$ form isomorphic principal filters in the lattice of r.e. sets.

Introduction The extension theorem revisited The high extension theorems The proof of the high extension theorem I The proof of the high extension theorem II Lowness notions in the lattice of r.e. sets Bibliography.

Erscheint lt. Verlag	28.2.1995
Reihe/Serie	Memoirs of the American Mathematical Society
Verlagsort	Providence
Sprache	englisch
Themenwelt	Mathematik / Informatik ► Mathematik ► Logik / Mengenlehre
ISBN-10	0-8218-2601-8 / 0821826018
ISBN-13	978-0-8218-2601-0 / 9780821826010
Zustand	Neuware