Eiichi Bannaĭ scite author profile

In this paper, we study self-dual codes over the ring Z 2k of the integers modulo 2k with relationships to even unimodular lattices, modular forms, and invariant rings of This work was supported in part by a grant from the Japan Society for the Promotion of Science. 1 nite groups. We introduce Type II codes over Z 2k which are closely related to even unimodular lattices, as a remarkable class of self-dual codes and a generalization of binary Type II codes. A construction of even unimodular lattices is given using Type II codes. Several examples of Type II codes are given, in particular the rst extremal Type II code over Z 6 of length 24 is constructed, which gives a new construction of the Leech lattice. The complete and symmetrized weight enumerators in genus g of codes over Z 2k are introduced, and the MacWilliams identities for these weight enumerators are given. We investigate the groups which x these weight enumerators of Type II codes over Z 2k and we give the Molien series of the invariant rings of the groups for small cases. We show that modular forms are constructed from complete and symmetrized weight enumerators of Type II codes. Shadow codes over Z 2k are also introduced. Index Term: Codes over Z 2k , Type II codes, even unimodular lattices, invariant rings.

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A survey on spherical designs and algebraic combinatorics on spheres

Bannaĭ

2009

European Journal of Combinatorics

147

167

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Tight spherical designs, I

Bannaĭ¹,

Damerell²

1979

J. Math. Soc. Japan

134

114

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Eiichi Bannaĭ

Algebraic Combinatorics

Type II codes, even unimodular lattices, and invariant rings

A survey on spherical designs and algebraic combinatorics on spheres

Tight spherical designs, I

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