Approximation of values of algebraic elements over the ring of power sums

Abstract

Let QEZ be the set of power sums whose characteristic roots belong to Z and whose coefficients belong to Q , i.e. G : N → Q satisfies equation* G(n) = Gn = b1 c1n + ·s + bh chn equation* with c1,…,ch ∈ Z and b1,…,bh ∈ Q . Furthermore, let f ∈ Q[x,y] be absolutely irreducible and α : N → Q be a solution y of f(Gn,y) = 0 , i.e. f(Gn,α(n)) = 0 identically in n . Then we will prove under suitable assumptions a lower bound, valid for all but finitely many positive integers n , for the approximation error if α(n) is approximated by rational numbers with bounded denominator. After that we will also consider the case that α is a solution of equation* f(Gn(0), …, Gn(d),y) = 0, equation* i.e. defined by using more than one power sum and a polynomial f satisfying some suitable conditions. This extends results of Bugeaud, Corvaja, Luca, Scremin and Zannier.

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