Analytic continuation of -generalized Fibonacci zeta function
Abstract
In this paper, for any positive integer ≥2, we define -generalized Fibonacci zeta function. We then study its analytic continuation to the whole complex plane C. Further, we compute a possible list of singularities and residues of the function at these simple poles. Moreover, we deduce that the special values of -generalized Fibonacci zeta function at negative integer arguments are rational.
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