English

Root lattices in number fields

Number Theory 2020-07-21 v3 Algebraic Geometry Combinatorics Group Theory Representation Theory

Abstract

We explore whether a root lattice may be similar to the lattice O\mathscr O of integers of a number field KK endowed with the inner product (x,y):=TraceK/Q(xθ(y))(x, y):={\rm Trace}_{K/\mathbb Q}(x\cdot\theta(y)), where θ\theta is an involution of KK. We classify all pairs KK, θ\theta such that O\mathscr O is similar to either an even root lattice or the root lattice Z[K:Q]\mathbb Z^{[K:\mathbb Q]}. We also classify all pairs KK, θ\theta such that O\mathscr O is a root lattice. In addition to this, we show that O\mathscr O is never similar to a positive-definite even unimodular lattice of rank 48\leqslant 48, in particular, O\mathscr O is not similar to the Leech lattice. In appendix, we give a general cyclicity criterion for the primary components of the discriminant group of O\mathscr O.

Keywords

Cite

@article{arxiv.2002.04641,
  title  = {Root lattices in number fields},
  author = {Vladimir L. Popov and Yuri G. Zarhin},
  journal= {arXiv preprint arXiv:2002.04641},
  year   = {2020}
}

Comments

23 pages. Introduction rewritten, Proposition 1 added, minor corrections in the formulation and proof of Theorem 5 implemented

R2 v1 2026-06-23T13:38:49.123Z