4,210 research outputs found
New extremal binary self-dual codes of length 68 via short kharaghani array over f_2 + uf_2
In this work, new construction methods for self-dual codes are given. The
methods use the short Kharaghani array and a variation of it. These are
applicable to any commutative Frobenius ring. We apply the constructions over
the ring F_2 + uF_2 and self-dual Type I [64, 32, 12]_2-codes with various
weight enumerators obtained as Gray images. By the use of an extension theorem
for self-dual codes we were able to construct 27 new extremal binary self-dual
codes of length 68. The existence of the extremal binary self-dual codes with
these weight enumerators was previously unknown.Comment: 10 pages, 5 table
Self-Dual Codes
Self-dual codes are important because many of the best codes known are of
this type and they have a rich mathematical theory. Topics covered in this
survey include codes over F_2, F_3, F_4, F_q, Z_4, Z_m, shadow codes, weight
enumerators, Gleason-Pierce theorem, invariant theory, Gleason theorems,
bounds, mass formulae, enumeration, extremal codes, open problems. There is a
comprehensive bibliography.Comment: 136 page
On the Residue Codes of Extremal Type II Z4-Codes of Lengths 32 and 40
In this paper, we determine the dimensions of the residue codes of extremal
Type II Z4-codes for lengths 32 and 40. We demonstrate that every binary doubly
even self-dual code of length 32 can be realized as the residue code of some
extremal Type II Z4-code. It is also shown that there is a unique extremal Type
II Z4-code of length 32 whose residue code has the smallest dimension 6 up to
equivalence. As a consequence, many new extremal Type II Z4-codes of lengths 32
and 40 are constructed.Comment: 19 page
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