Limit laws in the lattice problem. III. Return to the case of boxes

Abstract

We study the error of the number of points of a lattice L that belong to a rectangle, centred at 0, whose axes are parallel to the coordinate axes, dilated by a factor t and then translated by a vector X ∈ R2. When we consider the second order moment of the error relatively to X ∈ R2/L, one shows that, when t is random and becomes large and when the error is normalized by a quantity which behaves, in the admissible case, as (t), it converges in distribution to an explicit positive constant. In the case of a typical lattice L, we show that this result still holds but the normalisation is more important, around (t). We also show that when L=Z2, the error, when normalized by t, converges in distribution when t is random and becomes large and we compute the moments of the limit distribution.