English

A covariance equation

Complex Variables 2018-10-24 v1

Abstract

Let §\S be a commutative semigroup with identity ee and let Γ\Gamma be a compact subset in the pointwise convergence topology of the space §\S' of all non-zero multiplicative functions on §.\S. Given a continuous function F:ΓCF: \Gamma \to \mathbb C and a complex regular Borel measure μ\mu on Γ\Gamma such that μ(Γ)0.\mu(\Gamma) \not = 0. It is shown that μ(Γ)Γϱ(s)ϱ(t)F2(ϱ)dμ(ϱ)=Γϱ(s)F(ϱ)dμ(ϱ)Γϱ(t)F(ϱ)dμ(ϱ) \mu(\Gamma) \int_{\Gamma} \varrho(s) \overline{\varrho(t)} |F|^2(\varrho) d\mu(\varrho) = \int_{\Gamma} \varrho(s) F(\varrho) d\mu(\varrho) \int_{\Gamma} \overline{\varrho(t) F(\varrho)} d\mu(\varrho) for all (s,t)§×§(s, t) \in \S\times \S if and only if for some γΓ,\gamma \in \Gamma, the support of μ\mu is contained is contained in {F=0}{γ}\{ F = 0 \} \cup \{\gamma\}. Several applications of this characterization are derived. In particular, the reduction of our theorem to the semigroup of non-negative integers (N0,+)(\mathbb N_{0}, +) solves a problem posed by El Fallah, Klaja, Kellay, Mashregui and Ransford in a more general context. More consequences of our results are given, some of them illustrate the probabilistic flavor behind the problem studied herein and others establish extremal properties of analytic kernels.

Keywords

Cite

@article{arxiv.1810.09748,
  title  = {A covariance equation},
  author = {El Hassan Youssfi},
  journal= {arXiv preprint arXiv:1810.09748},
  year   = {2018}
}
R2 v1 2026-06-23T04:49:33.785Z