Gabriele Nebe, E. M. Rains, N. J. A. Sloane
Published 2003-11-04Version 1
The main theorem in this paper is a far-reaching generalization of Gleason's theorem on the weight enumerators of codes which applies to arbitrary-genus weight enumerators of self-dual codes defined over a large class of finite rings and modules. The proof of the theorem uses a categorical approach, and will be the subject of a forthcoming book. However, the theorem can be stated and applied without using category theory, and we illustrate it here by applying it to generalized doubly-even codes over fields of characteristic 2, doubly-even codes over the integers modulo a power of 2, and self-dual codes over the noncommutative ring $\F_q + \F_q u$, where $u^2 = 0$..
Conjugate weight enumerators and invariant theory
Automorphism Groups and Invariant Theory on PN
$E_8$-singularity, invariant theory and modular forms
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