A covariance equation

Abstract

Let be a commutative semigroup with identity e and let be a compact subset in the pointwise convergence topology of the space ' of all non-zero multiplicative functions on . Given a continuous function F: C and a complex regular Borel measure μ on such that μ() = 0. It is shown that μ() ∫ (s) (t) |F|2() dμ() = ∫ (s) F() dμ() ∫ (t) F() dμ() for all (s, t) ∈ × if and only if for some γ ∈ , the support of μ is contained is contained in \ F = 0 \ \γ\. Several applications of this characterization are derived. In particular, the reduction of our theorem to the semigroup of non-negative integers ( N0, +) 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.