A linear independence criterion for certain infinite series with polynomial orders

Abstract

Let q be a Pisot or Salem number. Let fj(x) (j=1,2,…) be integer-valued polynomials of degree 2 with positive leading coefficients, and let \aj (n)\n1 (j=1,2,…) be sequences of algebraic integers in the field Q(q) with suitable growth conditions. In this paper, we investigate linear independence over Q(q) of the numbers equation* 1, Σn=1∞ aj (n)qfj (n) (j=1,2,…). equation* In particular, when aj(n) (j=1,2,…) are polynomials of n, we give a linear independence criterion for the above numbers.

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