On the transcendence of growth constants associated with polynomial recursions

Abstract

Let P(x):=ad xd+·s+a0∈Q[x], ad>0, be a polynomial of degree d≥ 2. Let (xn) be a sequence of integers satisfying equation* xn+1=P(xn)for all n=0,1,2…,and xn∞as n∞. equation* Set α:=n∞ xd-nn. Then, under the assumption ad1/(d-1)∈Q, in a recent result by Dubickas dubickas, either α is transcendental, or α can be an integer, or a quadratic Pisot unit with α-1 being its conjugate over Q. In this paper, we study the nature of such α without the assumption that ad1/(d-1) is in Q, and we prove that either the number α is transcendental, or αh is a Pisot number with h being the order of the torsion subgroup of the Galois closure of the number field Q(α, ad-1d-1). Other results presented in this paper investigate the solutions of the inequality ||q1 α1n+·s+qk αkn +β||<θn in (n,q1,…,qk)∈ N×(K×)k, considering whether β is rational or irrational. Here, K represents a number field, and θ∈ (0,1). The notation ||x|| denotes the distance between x and its nearest integer in Z.

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