On the Pair Correlation of Zeros of L-Functions for Non-CM Newforms in Shifted Ranges
Abstract
We study the pair correlation between zeros of a shifted auxiliary L -function attached to a non-CM newform, the scale of which is a fixed constant. We prove an unconditional asymptotic result for the pair correlation and introduce a simplicity hypothesis for the zeros of this function, which if true means that multiple zeros of the original L -function cannot be separated by the same fixed distance. Our results provide macroscopic information in contrast to the pair correlation of the original L -function which is of microscopic nature.
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