Rosette Harmonic Mappings
Abstract
A harmonic mapping is a univalent harmonic function of one complex variable. We define a family of harmonic mappings on the unit disk whose images are rotationally symmetric rosettes with cusps or n nodes, where . These mappings are analogous to the -cusped hypocycloid, but are modified by Gauss hypergeometric factors, both in the analytic and co-analytic parts. Relative rotations by an angle of the analytic and anti-analytic parts lead to graphs that have cyclic, and in some cases dihedral symmetry of order . While the graphs for different can be dissimilar, the cusps are aligned along axes that are independent of . For certain isolated values of , the boundary function is continuous with arcs of constancy, and has nodes of interior angle .
Keywords
Cite
@article{arxiv.2003.13603,
title = {Rosette Harmonic Mappings},
author = {Jane McDougall and Lauren Stierman},
journal= {arXiv preprint arXiv:2003.13603},
year = {2021}
}
Comments
28 pages, 8 figures