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Bibliographic Details
Main Authors: Pausinger, Florian, Petrecca, David
Format: Preprint
Published: 2024
Subjects:
Online Access:https://arxiv.org/abs/2407.09217
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author Pausinger, Florian
Petrecca, David
author_facet Pausinger, Florian
Petrecca, David
contents We study the symmetry groups and winding numbers of planar curves obtained as images of weighted sums of exponentials. More generally, we study the image of the complex unit circle under a finite or infinite Laurent series using a particular parametrization of the circle. We generalize various previous results on such sums of exponentials and relate them to other classes of curves present in the literature. Moreover, we consider the evolution under the wave equation of such curves for the case of binomials. Interestingly, our methods provide a unified and systematic way of constructing curves with prescribed properties, such as the number of cusps, the number of intersection points or the winding number.
format Preprint
id arxiv_https___arxiv_org_abs_2407_09217
institution arXiv
publishDate 2024
record_format arxiv
spellingShingle Symmetry groups and deformations of sums of exponentials
Pausinger, Florian
Petrecca, David
Combinatorics
Differential Geometry
53A04, 33B10
We study the symmetry groups and winding numbers of planar curves obtained as images of weighted sums of exponentials. More generally, we study the image of the complex unit circle under a finite or infinite Laurent series using a particular parametrization of the circle. We generalize various previous results on such sums of exponentials and relate them to other classes of curves present in the literature. Moreover, we consider the evolution under the wave equation of such curves for the case of binomials. Interestingly, our methods provide a unified and systematic way of constructing curves with prescribed properties, such as the number of cusps, the number of intersection points or the winding number.
title Symmetry groups and deformations of sums of exponentials
topic Combinatorics
Differential Geometry
53A04, 33B10
url https://arxiv.org/abs/2407.09217