Srivastava code: Difference between revisions

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In coding theory, Srivastava codes form a class of parameterised error-correcting codes which are a special case of alternant codes.

The original Srivastava code over GF(q) of length n is defined by a parity check matrix H of alternant form

{\begin{bmatrix}{\frac {\alpha _{1}^{\mu }}{\alpha _{1}-w_{1}}}&\cdots &{\frac {\alpha _{n}^{\mu }}{\alpha _{n}-w_{1}}}\\\vdots &\ddots &\vdots \\{\frac {\alpha _{1}^{\mu }}{\alpha _{1}-w_{s}}}&\cdots &{\frac {\alpha _{n}^{\mu }}{\alpha _{n}-w_{s}}}\\\end{bmatrix}}

where the α_i and z_i are elements of GF(q^m)

The parameters of this code are length n, dimension ≥ n − ms and minimum distance ≥ s + 1.

F.J. MacWilliams; N.J.A. Sloane (1977). The Theory of Error-Correcting Codes. North-Holland, 357-360. ISBN 0-444-85193-3.

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 In [[coding theory]], '''Srivastava codes''' form a class of parameterised [[Error detection and correction|error-correcting codes]] which are a special case of [[alternant code]]s.
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 == References ==
-* {{cite book | author=F.J. MacWilliams | authorlink=Jessie MacWilliams | coauthors=N.J.A. Sloane | title=The Theory of Error-Correcting Codes | publisher=North-Holland | date=1977 | isbn=0-444-85193-3 | pages=357-360 }}
+* {{cite book | author=F.J. MacWilliams | authorlink=Jessie MacWilliams | coauthors=N.J.A. Sloane | title=The Theory of Error-Correcting Codes | publisher=North-Holland | date=1977 | isbn=0-444-85193-3 | pages=357-360 }}[[Category:Suggestion Bot Tag]]
-[[Category:Error detection and correction]]
-[[Category:Finite fields]]
-[[Category:Coding theory]]
-{{algebra-stub}}