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An Upper Bound on the Minimum Weight of Type II $\ZZ_{2k}$-Codes

Published 2009-06-26Version 1

In this paper, we give a new upper bound on the minimum Euclidean weight of Type II $\ZZ_{2k}$-codes and the concept of extremality for the Euclidean weights when $k=3,4,5,6$. Together with the known result, we demonstrate that there is an extremal Type II $\ZZ_{2k}$-code of length $8m$ $(m \le 8)$ when $k=3,4,5,6$.

Comments: 10 pages, 2 tables

Journal: J. Combin. Theory Ser. A 118 (2010), 190-196

Categories: math.CO, cs.IT, math.IT

Subjects: 94B05, 11F03

Keywords: upper bound, minimum weight, minimum euclidean weight, extremal type

Tags: journal article

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arXiv:0906.5023 [math.CO]Abstract References Reviews Resources

An Upper Bound on the Minimum Weight of Type II $\ZZ_{2k}$-Codes

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An Upper Bound on the Minimum Weight of Type II $\ZZ_{2k}$-Codes

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arXiv:0906.5023 [math.CO]Abstract References Reviews Resources