Introduction to Coding Theory
β J.H. van Lint
π Library
π
1998
π Springer
π English
β¦ LIBER β¦
π
Introduction to Coding Theory
β Scribed by J. H. van Lint (auth.)
- Publisher
- Springer Berlin Heidelberg
- Year
- 1992
- Tongue
- English
- Leaves
- 194
- Series
- Graduate Texts in Mathematics 86
- Category
- Library
β¬ Acquire This Volume
No coin nor oath required. For personal study only.
β¦ Table of Contents
Front Matter....Pages i-xi
Mathematical Background....Pages 1-21
Shannonβs Theorem....Pages 22-30
Linear Codes....Pages 31-41
Some Good Codes....Pages 42-57
Bounds on Codes....Pages 58-74
Cyclic Codes....Pages 75-101
Perfect Codes and Uniformly Packed Codes....Pages 102-117
Goppa Codes....Pages 118-126
Asymptotically Good Algebraic Codes....Pages 127-132
Arithmetic Codes....Pages 133-140
Convolutional Codes....Pages 141-154
Back Matter....Pages 155-186
β¦ Subjects
Number Theory; Combinatorics
π SIMILAR VOLUMES
Introduction to Coding Theory
β Ron Roth
π Library
π
2006
π Cambridge University Press
π English
Error-correcting codes constitute one of the key ingredients in achieving the high degree of reliability required in modern data transmission and storage systems. This book introduces the reader to the theoretical foundations of this subject with the emphasis on the Reed-Solomon codes and their d
Introduction to coding theory
β Ron Roth
π Library
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2006
π Cambridge University Press
π English
Error-correcting codes constitute one of the key ingredients in achieving the high degree of reliability required in modern data transmission and storage systems. This book introduces the reader to the theoretical foundations of error-correcting codes, with an emphasis on Reed-Solomon codes and thei
Introduction to Coding Theory
β J. H. van Lint (auth.)
π Library
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1999
π Springer-Verlag Berlin Heidelberg
π English
<p>It is gratifying that this textbook is still sufficiently popular to warrant a third edition. I have used the opportunity to improve and enlarge the book. When the second edition was prepared, only two pages on algebraic geometry codes were added. These have now been removed and replaced by a rel
Introduction to Coding Theory
β J. H. van Lint (auth.)
π Library
π
1982
π Springer Berlin Heidelberg
π English
Introduction to Coding Theory
β J.H. van Lint
π Library
π
2012
π Springer Science & Business Media
π English
The first edition of this book was conceived in 1981 as an alternative to outdated, oversized, or overly specialized textbooks in this area of discrete mathematics-a field that is still growing in importance as the need for mathematicians and computer scientists in industry continues to grow. The bo