With the Delsarte-MacWilliams inequalities as a starting point, an upper bound is obtained on the rate of a binary code as a function of its minimum distance. This upper bound is asymptotically less than Levenshtein's bound, and so also Elias's

Eugene R. Rodemich

Howard Rumsey

Lloyd

R. Welch

Robert J. Mceliece

English

McEliece, Robert J.

Rodemich, Eugene R.

Rumsey, Howard, Jr.

Welch, Lloyd R.

Caltech Authors - Main

New upper bounds on the rate of a code via the Delsarte-MacWilliams inequalities

Algebraic Coding Theory.

An Algebraic Approach to the Association Schemes of Codinz Theory. Eindhoven: Philips Research Reports Supplements no.

Orthogonal Polynomials and Special Functions.

Upper bounds on the cardinality of a binary code with a given minimum distance” (in Russian),

http://authors.library.caltech.edu/6934/1/MCEieeetit77a.pdf

New upper bounds on the rate of a code via the Delsarte-MacWilliams inequalities

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Caltech Authors - Main