中文

Lattices and codes with long shadows

数论 2007-05-23 v1

摘要

In an earlier paper (math.NT/9906019) we showed that any integral unimodular lattice L of rank n which is not isometric with Z^n has a characteristic vector of norm at most n-8. [A "characteristic vector" of L is a vector w in L such that 2|(v,w-v) for all v in L; it is known that the characteristic vectors all have norm congruent to n mod 8 and comprise a coset of 2L in L.] Here we use modular forms and the classification of unimodular lattices of rank <24 to find all L whose minimal characteristic vectors have norm n-8. Along the way we also obtain congruences and a lower bound on the kissing number of unimodular lattices with minimal norm 2. We then state and prove analogues of these results for self-dual codes, and relate them directly to the lattice problems via "Construction A".

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引用

@article{arxiv.math/9906086,
  title  = {Lattices and codes with long shadows},
  author = {Noam D. Elkies},
  journal= {arXiv preprint arXiv:math/9906086},
  year   = {2007}
}

备注

8 pages. Note: Mark Gaulter has since established the existence of integers N_k also for k=2,3