泽塔零点和凸面波算子

IF 1.2 3区 数学 Q1 MATHEMATICS
Alain Connes, Caterina Consani, Henri Moscovici
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引用次数: 0

摘要

我们在半局域迹公式的框架内,通过引入半局域波算子类似物,整合了关于黎曼zeta函数零点谱实现的两个最新发现。后者在zeta函数低位零点的谱实现--使用其谱的正部分--以及它们的紫外行为--使用与谱的负部分相对应的索宁空间--中都起着关键作用。在阿基米德情况下,凸算子是缩放算子与正交多项式分级的平方和。我们证明了半局部索宁空间在管理半局部框架的有限位置集增加时的稳定性,并描述了它们与全函数希尔伯特空间的关系。最后,我们将凸算子与({\text {SL}}(2,\mathbb {R})\)的双盖的元表示联系起来,目的是(在即将发表的论文中)获得半局部凸算子的第二个候选者。
本文章由计算机程序翻译,如有差异,请以英文原文为准。
Zeta zeros and prolate wave operators

We integrate in the framework of the semilocal trace formula two recent discoveries on the spectral realization of the zeros of the Riemann zeta function by introducing a semilocal analogue of the prolate wave operator. The latter plays a key role both in the spectral realization of the low lying zeros of zeta—using the positive part of its spectrum—and of their ultraviolet behavior—using the Sonin space which corresponds to the negative part of the spectrum. In the archimedean case the prolate operator is the sum of the square of the scaling operator with the grading of orthogonal polynomials, and we show that this formulation extends to the semilocal case. We prove the stability of the semilocal Sonin space under the increase of the finite set of places which govern the semilocal framework and describe their relation with Hilbert spaces of entire functions. Finally, we relate the prolate operator to the metaplectic representation of the double cover of \({\text {SL}}(2,\mathbb {R})\) with the goal of obtaining (in a forthcoming paper) a second candidate for the semilocal prolate operator.

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来源期刊
Annals of Functional Analysis
Annals of Functional Analysis MATHEMATICS, APPLIED-MATHEMATICS
CiteScore
2.00
自引率
10.00%
发文量
64
期刊介绍: Annals of Functional Analysis is published by Birkhäuser on behalf of the Tusi Mathematical Research Group. Ann. Funct. Anal. is a peer-reviewed electronic journal publishing papers of high standards with deep results, new ideas, profound impact, and significant implications in all areas of functional analysis and all modern related topics (e.g., operator theory). Ann. Funct. Anal. normally publishes original research papers numbering 18 or fewer pages in the journal’s style. Longer papers may be submitted to the Banach Journal of Mathematical Analysis or Advances in Operator Theory. Ann. Funct. Anal. presents the best paper award yearly. The award in the year n is given to the best paper published in the years n-1 and n-2. The referee committee consists of selected editors of the journal.
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