English

Exact essential norm of generalized Hilbert matrix operators on classical analytic function spaces

Functional Analysis 2022-01-25 v1 Complex Variables

Abstract

We compute the exact value of the essential norm of a generalized Hilbert matrix operator acting on weighted Bergman spaces AvpA^p_v and weighted Banach spaces HvH^\infty_v of analytic functions, where vv is a general radial weight. In particular, we obtain the exact value of the essential norm of the classical Hilbert matrix operator on standard weighted Bergman spaces AαpA^p_\alpha for p>2+α,α0,p>2+\alpha, \, \alpha \ge 0, and on Korenblum spaces HαH^\infty_\alpha for 0<α<1.0 < \alpha < 1. We also cover the Hardy space Hp,1<p<,H^p, \, 1 < p < \infty, case. In the weighted Bergman space case, the essential norm of the Hilbert matrix is equal to the conjectured value of its operator norm and similarly in the Hardy space case the essential norm and the operator norm coincide. We also compute the exact value of the norm of the Hilbert matrix on HwαH^\infty_{w_\alpha} with weights wα(z)=(1z)αw_\alpha(z)=(1-|z|)^\alpha for all 0<α<10 < \alpha < 1. Also in this case, the values of the norm and essential norm coincide.

Keywords

Cite

@article{arxiv.2201.09591,
  title  = {Exact essential norm of generalized Hilbert matrix operators on classical analytic function spaces},
  author = {Mikael Lindström and Santeri Miihkinen and David Norrbo},
  journal= {arXiv preprint arXiv:2201.09591},
  year   = {2022}
}

Comments

23 pages, 1 figure

R2 v1 2026-06-24T08:59:56.285Z