On numbers n with polynomial image coprime with the nth term of a linear recurrence
Abstract
Let F be an integral linear recurrence, G be an integer-valued polynomial splitting over the rationals, and h be a positive integer. Also, let AF,G,h be the set of all natural numbers n such that (F(n), G(n)) = h. We prove that AF,G,h has a natural density. Moreover, assuming F is non-degenerate and G has no fixed divisors, we show that d(AF,G,1) = 0 if and only if AF,G,1 is finite.
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