English

The hyperbolic cosine transform and its applications to composition operators

Functional Analysis 2023-06-27 v1

Abstract

In this paper we characterize hyperbolic cosine transforms of (positive) Borel measures ν\nu in terms of exponential convexity (Bernstein's terminology). The case of compactly supported measures ν\nu is also considered. All of this is then applied to (bounded) composition operators CT,ρ ⁣:ffTC_{T,\rho}\colon f \mapsto f \circ T on L2(\rbbκ,μρ)L^2(\rbb^\kappa,\mu_{\rho}) with affine symbols T=A+aT=A+a, where \Dμρ(x)=ρ(x)\Dx\D \mu_{\rho} (x) = \rho(x) \D x, ρ(x)=ψ(x)1\rho(x)= \psi(\|x\|)^{-1}, ψ\psi is a continuous positive real valued function and \|\cdot\| is the Euclidean norm on \rbbκ\rbb^{\kappa}. The main result states that the map \rbbκaCI+a,ρ\rbb^{\kappa} \ni a \mapsto C_{I+a,\rho} is continuous in the strong operator topology and has cosubnormal values if and only if ψ\psi is the hyperbolic cosine transform of a compactly supported Borel measure (II is the identity transformation). The case of affine symbols TT that are not translations is also discussed.

Keywords

Cite

@article{arxiv.2306.14338,
  title  = {The hyperbolic cosine transform and its applications to composition operators},
  author = {Jan Stochel and Jerzy Stochel},
  journal= {arXiv preprint arXiv:2306.14338},
  year   = {2023}
}

Comments

29 pages

R2 v1 2026-06-28T11:14:00.446Z