The invariants of the Clifford groups
Abstract
The automorphism group of the Barnes-Wall lattice Lm in dimension 2m (m not 3) is a subgroup of index 2 in a certain ``Clifford group'' Cm (an extraspecial group of order 2(1+2m) extended by an orthogonal group). This group and its complex analogue CCm have arisen in recent years in connection with the construction of orthogonal spreads, Kerdock sets, packings in Grassmannian spaces, quantum codes, Siegel modular forms and spherical designs. In this paper we give a simpler proof of Runge's 1996 result that the space of invariants for Cm of degree 2k is spanned by the complete weight enumerators of the codes obtained by tensoring binary self-dual codes of length 2k with the field GF(2m); these are a basis if m >= k-1. We also give new constructions for Lm and Cm: let M be the Z[sqrt(2)]-lattice with Gram matrix [2, sqrt(2); sqrt(2), 2]. Then Lm is the rational part of the mth tensor power of M, and Cm is the automorphism group of this tensor power. Also, if C is a binary self-dual code not generated by vectors of weight 2, then Cm is precisely the automorphism group of the complete weight enumerator of the tensor product of C and GF(2m). There are analogues of all these results for the complex group CCm, with ``doubly-even self-dual code'' instead of ``self-dual code''.
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