A modified CFKRS recipe correctly predicts the secondary main term in the second moment of Dirichlet L-functions along cosets by incorporating the non-independence of root numbers and coefficients.
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4 Pith papers cite this work. Polarity classification is still indexing.
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math.NT 4years
2026 4verdicts
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Any number of primitive GL(1) and GL(2) L-functions can simultaneously take large values on the critical line unconditionally, improving prior conditional results.
Partial results on low-lying zero densities imply explicit conditional lower bounds on central L-values, with bound quality tied to family symmetry type and allowed Fourier support.
Upper bounds on the least prime satisfying the Ramanujan conjecture simultaneously for two or three Hecke-Maass forms, and lower bounds on the natural density of primes satisfying it for at least one form in a given set.
citing papers explorer
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Remarks on the distribution of Dirichlet $L$-functions along cosets
A modified CFKRS recipe correctly predicts the secondary main term in the second moment of Dirichlet L-functions along cosets by incorporating the non-independence of root numbers and coefficients.
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Joint extreme values of $L$-functions on and off the critical line
Any number of primitive GL(1) and GL(2) L-functions can simultaneously take large values on the critical line unconditionally, improving prior conditional results.
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A connection between low-lying zeros and central values of $L$-functions
Partial results on low-lying zero densities imply explicit conditional lower bounds on central L-values, with bound quality tied to family symmetry type and allowed Fourier support.
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On Ramanujan Primes for Hecke-Maass Cusp Forms
Upper bounds on the least prime satisfying the Ramanujan conjecture simultaneously for two or three Hecke-Maass forms, and lower bounds on the natural density of primes satisfying it for at least one form in a given set.