Codes on Euclidean spheres [E-Book] / Thomas Ericson, Victor Zinoviev.
Codes on Euclidean spheres are often referred to as spherical codes. They are of interest from mathematical, physical and engineering points of view. Mathematically the topic belongs to the realm of algebraic combinatorics, with close connections to number theory, geometry, combinatorial theory, and...
Saved in:
Full text |
|
Personal Name(s): | Ericson, Thomas. |
Zinoviev, Victor. | |
Edition: |
1st ed. |
Imprint: |
Amsterdam ; New York :
Elsevier,
2001
|
Physical Description: |
1 online resource (xiii, 549 p.) : ill. |
Note: |
englisch |
ISBN: |
9780444503299 0444503293 9780585473857 0080502164 0585473854 9780080502168 |
Series Title: |
/* Depending on the record driver, $field may either be an array with
"name" and "number" keys or a flat string containing only the series
name. We should account for both cases to maximize compatibility. */?>
North-Holland mathematical library,
v. 63 |
Subject (LOC): |
Codes on Euclidean spheres are often referred to as spherical codes. They are of interest from mathematical, physical and engineering points of view. Mathematically the topic belongs to the realm of algebraic combinatorics, with close connections to number theory, geometry, combinatorial theory, and - of course - to algebraic coding theory. The connections to physics occur within areas like crystallography and nuclear physics. In engineering spherical codes are of central importance in connection with error-control in communication systems. In that context the use of spherical codes is often referred to as "coded modulation." The book offers a first complete treatment of the mathematical theory of codes on Euclidean spheres. Many new results are published here for the first time. Engineering applications are emphasized throughout the text. The theory is illustrated by many examples. The book also contains an extensive table of best known spherical codes in dimensions 3-24, including exact constructions. |