Journal of Siberian Federal University. Mathematics & Physics: Power Series Nonextendable Across the Boundary of their Convergence Domain

Journal of Siberian Federal University. Mathematics & Physics / Power Series Nonextendable Across the Boundary of their Convergence Domain

Issue: Journal of Siberian Federal University. Mathematics & Physics. 2013 6 (3)
Authors: Mkrtchyan, Aleksandr D.
Contact information: Mkrtchyan, Aleksandr D.: Faculty of Mathematics and Mechanics, Yerevan State University, Alex Manoogian, 1, Yerevan, 375010 Armenia; Institute of Mathematics and Computer Science, Siberian Federal University, Svobodny, 79, Krasnoyarsk, 660041 Russia; e-mail:
Keywords: power series; analitic continuation; inﬁnitely diﬀerentiate; Dirichlet series
Abstract: In the article we construct a new power series in a single variable nonextendable through the boundary circle of the convergence disk. This series reﬁnes the known Fredholm‘s example. Using this series we construct a double power series that does not admit an analytic continuation across the boundary of its convergence domain.
Pages: 329-335
Paper at repository of SibFU: https://elib.sfu-kras.ru/handle/2311/9883