Generalized weighted composition-differentiation operators on weighted Bergman spaces

Abstract

Let H(D) be the class of all holomorphic functions in the unit disk D . We aim to explore the complex symmetry exhibited by generalized weighted composition-differentiation operators, denoted as Ln, , φ and is defined by align* Ln, , φ:=Σk=1nckDk, k, φ,\; where \; ck∈C\; for\; k=1, 2, …, n, align* where Dk, , φf(z):=(z)f(k)(φ(z)),\; f∈ A2α(D), in the reproducing kernel Hilbert space, labeled as A2α(D), which encompasses analytic functions defined on the unit disk D. By deriving a condition that is both necessary and sufficient, we provide insights into the Cμ, η -symmetry exhibited by Ln, , φ. The explicit conditions for which the operator T is Hermitian and normal are obtained through our investigation. Additionally, we conduct an in-depth analysis of the spectral properties of Ln, , φ under the assumption of Cμ, η -symmetry and thoroughly examine the kernel of the adjoint operator of Ln, , φ.