The spectrum of some Hardy kernel matrices

Pub Date : 2020-03-25 DOI:10.5802/aif.3589

Ole Fredrik Brevig, Karl-Mikael Perfekt, Alexander Pushnitski

引用次数: 3

Abstract

For $\alpha > 0$ we consider the operator $K_\alpha \colon \ell^2 \to \ell^2$ corresponding to the matrix \[\left(\frac{(nm)^{-\frac{1}{2}+\alpha}}{[\max(n,m)]^{2\alpha}}\right)_{n,m=1}^\infty.\] By interpreting $K_\alpha$ as the inverse of an unbounded Jacobi matrix, we show that the absolutely continuous spectrum coincides with $[0, 2/\alpha]$ (multiplicity one), and that there is no singular continuous spectrum. There are a finite number of eigenvalues above the continuous spectrum. We apply our results to demonstrate that the reproducing kernel thesis does not hold for composition operators on the Hardy space of Dirichlet series $\mathscr{H}^2$.

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一些Hardy核矩阵的谱

对于$\alpha > 0$，我们考虑对应于矩阵\[\left(\frac{(nm)^{-\frac{1}{2}+\alpha}}{[\max(n,m)]^{2\alpha}}\right)_{n,m=1}^\infty.\]的算子$K_\alpha \colon \ell^2 \to \ell^2$，通过将$K_\alpha$解释为无界Jacobi矩阵的逆，我们证明了绝对连续谱与$[0, 2/\alpha]$重合(多重度为1)，并且不存在奇异连续谱。连续谱上有有限个特征值。我们应用我们的结果证明了在Dirichlet级数的Hardy空间$\mathscr{H}^2$上复合算子的再现核命题不成立。

本文章由计算机程序翻译，如有差异，请以英文原文为准。

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