A uniform stability principle for dual lattices

Abstract

We prove a highly uniform stability or "almost-near" theorem for dual lattices of lattices L ⊂eq Rn. More precisely, we show that, for a vector x from the linear span of a lattice L ⊂eq Rn, subject to λ1(L) λ > 0, to be -close to some vector from the dual lattice L' of L, it is enough that the inner products u\,x are δ-close (with δ < 1/3) to some integers for all vectors u ∈ L satisfying \| u \| r, where r > 0 depends on n, λ, δ and , only. This generalizes an earlier analogous result proved for integral vector lattices by M. Macaj and the second author. The proof is nonconstructive, using the ultraproduct construction and a slight portion of nonstandard analysis.