Dirichlet Functions Generated by Blaschke Products

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Abstract: The continuation of general Dirichlet series to meromorphic functions in the complex plane remains an outstanding problem. It has been completely solved only for Dirichlet L-series. A sufficient condition for the general case exists, however it is impossible to verify that it is fulfilled. We solve this problem here for another class of general Dirichlet series, namely those series which are obtained from infinite Blaschke products by a particular change of variable. This is a source of examples of general Dirichlet series with infinitely many poles. An interesting new case is now revealed, in which the singular points of the extended function form a continuum. We take a closer look at the case of Dirichlet series with natural boundary and give examples of such series. Some figures illustrate the theory.

WSEAS Transactions on Mathematics, ISSN / E-ISSN: 1109-2769 / 2224-2880, Volume 23, 2024, Art. #96

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Andrei-Florin Albişoru, Dorin Ghişa, "Dirichlet Functions Generated by Blaschke Products," WSEAS Transactions on Mathematics, vol. 23, pp. 926-939, 2024, DOI:10.37394/23206.2024.23.96
Andrei-Florin Albişoru, Dorin Ghişa. Dirichlet Functions Generated by Blaschke Products. WSEAS Transactions on Mathematics. 2024;23:926-939. 10.37394/23206.2024.23.96
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