On the exact value of the norm of the Hilbert matrix operator on weighted Bergman spaces
Abstract
In this article, the open problem of finding the exact value of the norm of the Hilbert matrix operator on weighted Bergman spaces \(A^p_\alpha\) is adressed. The norm was conjectured to be \(\frac{\pi}{\sin \frac{(2+\alpha)\pi}{p}}\) by Karapetrovic. We obtain a complete solution to the conjecture for \(\alpha > 0\) and \(2+\alpha+\sqrt{\alpha^2+\frac{7}{2}\alpha+3} \le p < 2(2+\alpha)\) and a partial solution for \(2+2\alpha < p < 2+\alpha+\sqrt{\alpha^2+\frac{7}{2}\alpha+3}\). Moreover, we also show that the conjecture is valid for small values of \(\alpha\) when \(2+2\alpha < p \le 3+2\alpha\). Finally, the case \(\alpha = 1\) is considered.Downloads
Published
2021-06-24
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Copyright (c) 2021 The Finnish Mathematical Society
This work is licensed under a Creative Commons Attribution-NonCommercial 4.0 International License.
How to Cite
Lindström, M., Miihkinen, S., & Wikman, N. (2021). On the exact value of the norm of the Hilbert matrix operator on weighted Bergman spaces. Annales Fennici Mathematici, 46(1), 201-224. https://afm.journal.fi/article/view/109770
