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Taming the Natural Boundary of Centered Polygonal Lacunary Functions—Restriction to the Symmetry Angle Space

Author

Listed:
  • Leah K. Mork

    (Department of Mathematics, Concordia College, Moorhead, MN 56562, USA)

  • Keith Sullivan

    (Department of Mathematics, Concordia College, Moorhead, MN 56562, USA)

  • Darin J. Ulness

    (Department of Chemistry, Concordia College, Moorhead, MN 56562, USA)

Abstract

This work investigates centered polygonal lacunary functions restricted from the unit disk onto symmetry angle space which is defined by the symmetry angles of a given centered polygonal lacunary function. This restriction allows for one to consider only the p -sequences of the centered polygonal lacunary functions which are bounded, but not convergent, at the natural boundary. The periodicity of the p -sequences naturally gives rise to a convergent subsequence, which can be used as a grounds for decomposition of the restricted centered polygonal lacunary functions. A mapping of the unit disk to the sphere allows for the study of the line integrals of restricted centered polygonal that includes analytic progress towards closed form representations. Obvious closures of the domain obtained from the spherical map lead to four distinct topological spaces of the “broom topology” type.

Suggested Citation

  • Leah K. Mork & Keith Sullivan & Darin J. Ulness, 2020. "Taming the Natural Boundary of Centered Polygonal Lacunary Functions—Restriction to the Symmetry Angle Space," Mathematics, MDPI, vol. 8(4), pages 1-17, April.
    • Handle: RePEc:gam:jmathe:v:8:y:2020:i:4:p:568-:d:344479
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    References listed on IDEAS

    as
    1. Nicolas Behr & Giuseppe Dattoli & Gérard H. E. Duchamp & Silvia Licciardi & Karol A. Penson, 2019. "Operational Methods in the Study of Sobolev-Jacobi Polynomials," Mathematics, MDPI, vol. 7(2), pages 1-34, January.
    2. Keith Sullivan & Drew Rutherford & Darin J. Ulness, 2019. "Centered Polygonal Lacunary Sequences," Mathematics, MDPI, vol. 7(10), pages 1-34, October.
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    Cited by:

    1. Georgia Irina Oros, 2022. "Geometrical Theory of Analytic Functions," Mathematics, MDPI, vol. 10(18), pages 1-4, September.

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