Exploring RANDOMNESS
Gregory J. Chaitin
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Description for Exploring RANDOMNESS
Paperback. Series: Discrete Mathematics and Theoretical Computer Science. Num Pages: 164 pages, biography. BIC Classification: PBT; UMB; UMX. Category: (P) Professional & Vocational. Dimension: 233 x 153 x 13. Weight in Grams: 282.
In The Unknowable I use LISP to compare my work on incompleteness with that of G6del and Turing, and in The Limits of Mathematics I use LISP to discuss my work on incompleteness in more detail. In this book we'll use LISP to explore my theory of randomness, called algorithmic information theory (AIT). And when I say "explore" I mean it! This book is full of exercises for the reader, ranging from the mathematical equivalent oftrivial "fin ger warm-ups" for pianists, to substantial programming projects, to questions I can formulate precisely but don't know how to answer, to questions that ... Read more
In The Unknowable I use LISP to compare my work on incompleteness with that of G6del and Turing, and in The Limits of Mathematics I use LISP to discuss my work on incompleteness in more detail. In this book we'll use LISP to explore my theory of randomness, called algorithmic information theory (AIT). And when I say "explore" I mean it! This book is full of exercises for the reader, ranging from the mathematical equivalent oftrivial "fin ger warm-ups" for pianists, to substantial programming projects, to questions I can formulate precisely but don't know how to answer, to questions that ... Read more
Product Details
Format
Paperback
Publication date
2012
Publisher
Springer London Ltd United Kingdom
Number of pages
180
Condition
New
Series
Discrete Mathematics and Theoretical Computer Science
Number of Pages
164
Place of Publication
England, United Kingdom
ISBN
9781447110859
SKU
V9781447110859
Shipping Time
Usually ships in 15 to 20 working days
Ref
99-15
Reviews for Exploring RANDOMNESS
From the reviews: "In this book on algorithmic information theory, the author compares his concept of randomness (for recursive functions) which is based on the complexity (length) of the generating algorithm (program) with other concepts (by Martin-Löw, Solovay) and discusses its relation to incompleteness and the halting problem. Algorithms (needed for proof) are described in a (small) dialect ... Read more