On the Commutant of the Generalized Backward Shift Operator in Weighted Spaces of Entire Functions

Abstract: We investigate continuous linear operators, which commute with the generalized backward shift operator (a one-dimensional perturbation of the Pommiez operator) in a countable inductive limit $E$ of weighted Banach spaces of entire functions. This space E is isomorphic with the help of the Fourier-Laplace transform to the strong dual of the Fr\'echet space of all holomorphic functions on a convex domain Q in the complex plane, containing the origin. Necessary and sufficient conditions are obtained that an operator of the mentioned commutant is a topological isomorphism of E. The problem of the factorization of nonzero operators of this commutant is investigated. In the case when the function, defining the generalized backward shift operator, has zeros in Q, they are divided into two classes: the first one consists of isomorphisms and surjective operators with a finite-dimensional kernel, and the second one contains finite-dimensional operators. Using obtained results, we study the generalized Duhamel product in Fr\'echet space of all holomorphic functions on Q.