Hierarchy of Turing Degrees : A Transfinite Hierarchy of Lowness Notions in t...

Description: Hierarchy of Turing Degrees : A Transfinite Hierarchy of Lowness Notions in the Computably Enumerable Degrees, Unifying Classes, and Natural Definability, Paperback by Downey, Rod; Greenberg, Noam, ISBN 0691199663, ISBN-13 9780691199665, Like New Used, Free shipping in the US

Computability theory is a branch of mathematical logic and computer science that has become increasingly relevant in recent years. The field has developed growing connections in diverse areas of mathematics, with applications in topology, group theory, and other subfields.

In A Hierarchy of Turing Degrees, Rod Downey and Noam Greenberg introduce a new hierarchy that allows them to classify the combinatorics of constructions from many areas of computability theory, including algorithmic randomness, Turing degrees, effectively closed sets, and effective structure theory. This unifying hierarchy gives rise to new natural definability results for Turing degree classes, demonstrating how dynamic constructions become reflected in definability. Downey and Greenberg present numerous construction techniques involving high-level nonuniform arguments, and their self-contained work is appropriate for graduate students and researchers.

Blending traditional and modern research results in computability theory, A Hierarchy of Turing Degrees establishes novel directions in the field.

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Book Title: Hierarchy of Turing Degrees : A Transfinite Hierarchy of Lowness

Item Length: 9.2in

Item Height: 0.7in

Item Width: 6.1in

Author: Rod Downey, Noam Greenberg

Publication Name: Hierarchy of Turing Degrees : A Transfinite Hierarchy of Lowness Notions in the Computably Enumerable Degrees, Unifying Classes, and Natural Definability (AMS-206)

Format: Trade Paperback

Language: English

Publisher: Princeton University Press

Publication Year: 2020

Series: Annals of Mathematics Studies

Type: Textbook

Item Weight: 12.9 Oz

Number of Pages: 240 Pages