Prime ideal divisors of parametric recurrence sequences
Abstract
We prove new arithmetic results for parametric linear recurrence sequences specialized at roots of unity, denoted by (Un(ζ))n≥ 0. In particular, we obtain effective lower bounds for the largest prime ideal divisor and norm of the radical of the principal ideal generated by Un(ζ). We further derive an effective upper bound for the S-part of Un(ζ), showing that it is strictly smaller than a fixed power of its absolute norm for sufficiently large n.
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