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引用次数: 0
摘要
假设存在广义黎曼假设,我们证明了移位狄利克特 L 函数矩的尖锐上界。我们利用它得到了 Theta 函数高矩数的条件上界。这两个结果都加强了芒施的定理,芒施证明了这些量的近乎尖锐的上界。我们证明的主要新成分来自哈珀的一篇论文,他证明了黎曼假设下的所有相关结果。最后,我们得到了任意长度特征和的高矩数的尖锐条件上界。
High moments of theta functions and character sums
Assuming the Generalised Riemann Hypothesis, we prove a sharp upper bound on moments of shifted Dirichlet L-functions. We use this to obtain conditional upper bounds on high moments of theta functions. Both of these results strengthen theorems of Munsch, who proved almost sharp upper bounds for these quantities. The main new ingredient of our proof comes from a paper of Harper, who showed the related result for all under the Riemann Hypothesis. Finally, we obtain a sharp conditional upper bound on high moments of character sums of arbitrary length.
期刊介绍:
Mathematika publishes both pure and applied mathematical articles and has done so continuously since its founding by Harold Davenport in the 1950s. The traditional emphasis has been towards the purer side of mathematics but applied mathematics and articles addressing both aspects are equally welcome. The journal is published by the London Mathematical Society, on behalf of its owner University College London, and will continue to publish research papers of the highest mathematical quality.