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

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 o… Show more

“…Paper [3] investigates centered polygonal lacunary functions restricted on the unit disk and in the symmetry angle space, which is defined by the symmetry the angles of a given centered polygonal lacunary function. The periodicity of the p-sequences and the existence of a convergent subsequence provided a framework for the decomposition of the centered polygonal lacunary functions.…”

“…Funding: The research presented in [3] was funded by the Concordia College Chemistry Endowment Fund. The research presented in [6] was funded by Universiti Kebangsaan Malaysia, grant number GUP-2019-032.…”

Geometrical Theory of Analytic Functions

“…Paper [3] investigates centered polygonal lacunary functions restricted on the unit disk and in the symmetry angle space, which is defined by the symmetry the angles of a given centered polygonal lacunary function. The periodicity of the p-sequences and the existence of a convergent subsequence provided a framework for the decomposition of the centered polygonal lacunary functions.…”

“…Funding: The research presented in [3] was funded by the Concordia College Chemistry Endowment Fund. The research presented in [6] was funded by Universiti Kebangsaan Malaysia, grant number GUP-2019-032.…”

Geometrical Theory of Analytic Functions

Rotationally Symmetric Lacunary Functions and Products of Centered Polygonal Lacunary Functions