The nth centered moments of a large orthogonal family of automorphic L-functions
Abstract
We obtain the nth centered moments of one level densities of a large orthogonal family of L-functions associated with holomorphic Hecke newforms of level q, averaged over q Q. We verify the Katz-Sarnak conjecture for these statistics, in the range where the sum of the supports of the Fourier transforms of test functions lies in (-4, 4). In so doing, we need to understand certain phantom oversized terms, which allow us to extract the right off-diagonal contributions. We further need to resolve the combinatorial problem that arises when matching our main terms with random matrix predictions.
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