New extremal Type II Z4-codes of length 64 by the doubling method

Abstract

Extremal Type II Z4-codes are a class of self-dual Z4-codes with Euclidean weights divisible by eight and the largest possible minimum Euclidean weight for a given length. A small number of such codes is known for lengths greater than or equal to 48. The doubling method is a method for constructing Type II Z4-codes from a given Type II Z4-code. Based on the doubling method, in this paper we develop a method to construct new extremal Type II Z4-codes starting from an extremal Type II Z4-code of type 4k with an extremal residue code and length 48, 56 or 64. Using this method, we construct three new extremal Type II Z4-codes of length 64 and type 43122. Extremal Type II Z4-codes of length 64 of this type were not known before. Moreover, the residue codes of the constructed extremal Z4-codes are new best known [64,31] binary codes and the supports of the minimum weight codewords of the residue code and the torsion code of one of these codes form self-orthogonal 1-designs.

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