On an effective variation of Kronecker's approximation theorem avoiding algebraic sets

Abstract

Let ⊂ Rn be an algebraic lattice, coming from a projective module over the ring of integers of a number field K. Let Z ⊂ Rn be the zero locus of a finite collection of polynomials such that Z or a finite union of proper full-rank sublattices of . Let K1 be the number field generated over K by coordinates of vectors in , and let L1,…,Lt be linear forms in n variables with algebraic coefficients satisfying an appropriate linear independence condition over K1. For each > 0 and a ∈ Rn, we prove the existence of a vector x ∈ Z of explicitly bounded sup-norm such that \| Li( x) - ai \| < for each 1 ≤ i ≤ t, where \|\ \| stands for the distance to the nearest integer. The bound on sup-norm of x depends on , as well as on , K, Z and heights of linear forms. This presents a generalization of Kronecker's approximation theorem, establishing an effective result on density of the image of Z under the linear forms L1,…,Lt in the t-torus~ Rt/ Zt.