Sharp norm estimates for composition operators and Hilbert-type inequalities

Abstract

Let H2 denote the Hardy space of Dirichlet series f(s) = Σn≥1 an n-s with square summable coefficients and suppose that is a symbol generating a composition operator on H2 by C(f) = f . Let ζ denote the Riemann zeta function and α0=1.48… the unique positive solution of the equation αζ(1+α)=2. We obtain sharp upper bounds for the norm of C on H2 when 0<Re(+∞)-1/2 ≤ α0, by relating such sharp upper bounds to the best constant in a family of discrete Hilbert-type inequalities.