矩阵值\(L\!\log \!L\) -Orlicz势的Weyl定律和Connes积分公式

IF 0.9 3区数学 Q3 MATHEMATICS, APPLIED Mathematical Physics, Analysis and Geometry Pub Date : 2022-03-12 DOI:10.1007/s11040-022-09422-9

Raphaël Ponge

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引用次数: 5

摘要

由于Birman-Schwinger原理，针对Birman-Schwinger算子的Weyl定律产生了对应Schrödinger算子的半经典Weyl定律。在最近的一篇预印本中，Rozenblum建立了相当一般的Weyl定律，用于与临界阶伪微分算子和势相关联的Birman-Schwinger算子，这些算子是\(L\!\log \!L\) -Orlicz函数和alfors -正则测度在子流形上的乘积。在本文中，我们证明了，对于整个流形上支持的矩阵值\(L\!\log \!L\) -Orlicz势，Rozenblum的结果是sukochevv - zanin最近建立的环面上的cwikel型估计的直接结果。作为应用，我们得到了与矩阵值\(L\!\log \!L\) -Orlicz势相关的临界Schrödinger算子的clr型不等式和半经典Weyl定律。最后，我们解释了本文的Weyl定律如何暗示了矩阵值\(L\!\log \!L\) -Orlicz势的Connes积分公式的一个强版本。

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Weyl’s Laws and Connes’ Integration Formulas for Matrix-Valued \(L\!\log \!L\)-Orlicz Potentials

Thanks to the Birman-Schwinger principle, Weyl’s laws for Birman-Schwinger operators yields semiclassical Weyl’s laws for the corresponding Schrödinger operators. In a recent preprint Rozenblum established quite general Weyl’s laws for Birman-Schwinger operators associated with pseudodifferential operators of critical order and potentials that are product of \(L\!\log \!L\)-Orlicz functions and Alfhors-regular measures supported on a submanifold. In this paper, we show that, for matrix-valued \(L\!\log \!L\)-Orlicz potentials supported on the whole manifold, Rozenblum’s results are direct consequences of the Cwikel-type estimates on tori recently established by Sukochev–Zanin. As applications we obtain CLR-type inequalities and semiclassical Weyl’s laws for critical Schrödinger operators associated with matrix-valued \(L\!\log \!L\)-Orlicz potentials. Finally, we explain how the Weyl’s laws of this paper imply a strong version of Connes’ integration formula for matrix-valued \(L\!\log \!L\)-Orlicz potentials.

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来源期刊

Mathematical Physics, Analysis and Geometry 数学-物理：数学物理

CiteScore

2.10

自引率

0.00%

发文量

审稿时长

>12 weeks

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