Hierarchy of Turing Degrees

Name: Hierarchy of Turing Degrees
Brand: Princeton University Press
SKU: 9780691199665
Price: 90.99 EUR
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Rod Downey | Noam Greenberg

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A01=Noam Greenberg

A01=Rod Downey

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Algorithm

Algorithmic learning theory

AND gate

Approximation

Arbitrarily large

Arithmetic

Author_Noam Greenberg

Author_Rod Downey

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Binary number

Category1=Non-Fiction

Category=PBCD

Category=PBW

Category=UY

Characteristic function (probability theory)

Combination

Combinatorics

Computability

Computability theory

Computable analysis

Computable function

Computable number

Computation

COP=United States

Counterexample

Decision problem

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Discrete space

Distributive lattice

Dyadic rational

Elaboration

Embedding

Entscheidungsproblem

Enumeration

eq_bestseller

eq_computing

eq_isMigrated=0

eq_isMigrated=2

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Godel's incompleteness theorems

Halting problem

I0

Identity function

Iteration

Join and meet

Language_English

Limit ordinal

Limit superior and limit inferior

Mathematical induction

Mathematics

Maximal element

Maximal set

Model of computation

Modular lattice

N0

Natural number

Notation

Open set

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Ordinal analysis

Ordinal arithmetic

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Pairwise

Partially ordered set

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Propositional calculus

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Recursion (computer science)

Recursively enumerable set

Requirement

Restriction (mathematics)

Result

Reverse mathematics

Scientific notation

Set theory

SN=Annals of Mathematics Studies

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Subset

Summation

Theorem

Tree (data structure)

Truth table

Turing degree

Turing machine

Turing reduction

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Word problem (mathematics)

Word problem for groups

Product details

ISBN 9780691199665
Dimensions: 156 x 235mm
Publication Date: 16 Jun 2020
Publisher: Princeton University Press
Publication City/Country: US
Product Form: Paperback
Language: English

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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.

Rod Downey and Noam Greenberg are professors of mathematics at Victoria University of Wellington in New Zealand. Downey is the coauthor of Parameterized Complexity, Algorithmic Randomness and Complexity, and Fundamentals of Parameterized Complexity. Greenberg is the author of The Role of True Finiteness in the Admissible Recursively Enumerable Degrees.

Hierarchy of Turing Degrees

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