English

Sharp norm estimates for composition operators and Hilbert-type inequalities

Functional Analysis 2017-12-20 v2 Classical Analysis and ODEs

Abstract

Let H2\mathscr{H}^2 denote the Hardy space of Dirichlet series f(s)=n1annsf(s) = \sum_{n\geq1} a_n n^{-s} with square summable coefficients and suppose that φ\varphi is a symbol generating a composition operator on H2\mathscr{H}^2 by Cφ(f)=fφ\mathscr{C}_\varphi(f) = f \circ \varphi. Let ζ\zeta denote the Riemann zeta function and α0=1.48\alpha_0=1.48\ldots the unique positive solution of the equation αζ(1+α)=2\alpha\zeta(1+\alpha)=2. We obtain sharp upper bounds for the norm of Cφ\mathscr{C}_\varphi on H2\mathscr{H}^2 when 0<Reφ(+)1/2α00<\operatorname{Re}\varphi(+\infty)-1/2 \leq \alpha_0, by relating such sharp upper bounds to the best constant in a family of discrete Hilbert-type inequalities.

Keywords

Cite

@article{arxiv.1705.01316,
  title  = {Sharp norm estimates for composition operators and Hilbert-type inequalities},
  author = {Ole Fredrik Brevig},
  journal= {arXiv preprint arXiv:1705.01316},
  year   = {2017}
}

Comments

This paper has been accepted for publication in Bulletin of the LMS

R2 v1 2026-06-22T19:35:20.706Z