Logo

Computability Theory by Wilfried Sieg

Small book cover: Computability Theory

Computability Theory
by

Publisher: Carnegie Mellon University
Number of pages: 125

Description:
Computability is the basic theoretical concept for computer science, artificial intelligence and cognitive science. This essay discusses, at its heart, methodological issues that are central to any mathematical theory that is to reflect parts of our physical or intellectual experience.

Home page url

Download or read it online for free here:
Download link
(multiple formats)

Similar books

Book cover: Prolog Experiments in Discrete Mathematics, Logic, and ComputabilityProlog Experiments in Discrete Mathematics, Logic, and Computability
by - Portland State University
Programming experiments designed to help learning of discrete mathematics, logic, and computability. Most of the experiments are short and to the point, just like traditional homework problems, so that they reflect the daily classroom work.
(14092 views)
Book cover: Computability and Complexity from a Programming PerspectiveComputability and Complexity from a Programming Perspective
by - The MIT Press
The author builds a bridge between computability and complexity theory and other areas of computer science. Jones uses concepts familiar from programming languages to make computability and complexity more accessible to computer scientists.
(6759 views)
Book cover: Recursion TheoryRecursion Theory
by - National University of Singapore
Recursion theory deals with the fundamental concepts on what subsets of natural numbers could be defined effectively and how complex the so defined sets are. This text gives an overview on the basic results and proof methods in recursion theory.
(5701 views)
Book cover: Computability and RandomnessComputability and Randomness
by - Oxford University Press
Covering the basics as well as recent research results, this book provides an introduction to the interface of computability and randomness for graduates and researchers in computability theory, theoretical computer science, and measure theory.
(7020 views)