Duhamel convolution product in the setting of Quantum calculus
Abstract
In this paper we introduce the notions of q-Duhamel product and q-integration operator. We prove that the classical Wiener algebra W(D) of all analytic functions on the unit disc D of the complex plane C with absolutely convergent Taylor series is a Banach algebra with respect to q-Duhamel product. We also describe the cyclic vectors of the q-integration operator on W(D) and characterize its commutant in terms of the q-Duhamel product operators.
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