Asymptotic formulas for sums of elements from a multiplicative group

Abstract

Let K be a number field, k≥ 2 an integer, (K*)k the k-fold direct product of K* with coordinatewise multiplication, and Γ a finitely generated subgroup of rank r of (K*)k. Further, let H(α) denote the absolute exponential height of an algebraic number α. Fix non-zero elements a1,… , ak∈ K. We give asymptotic formulas for the number of x=(x1,… , xk)∈Γ with H(a1x1+·s +akxk)≤ X as X∞ such that no non-empty subsum of a1x1+·s +akxk vanishes. By the same method of proof, we obtain an asymptotic formula as X∞ for the number of non-negative integers n with H(un)≤ X, where \ un\ is a linear recurrence sequence.