A locus construction in the hyperbolic plane for elliptic curves with cross-ratio on the unit circle
Date of Award
2011
Document Type
Thesis
Degree Name
Master of Arts in Mathematics
Department
Mathematics
First Advisor
Sarli, John
Second Advisor
Dunn, Corey
Third Advisor
Addington, Susan, and Williams, Peter
Abstract
This project demonstrates how an elliptic curve f defined by invariance under two involutions can be represented by the locus of circumcenters of isosceles triangles in the hyperbolic plane, using inversive model.
Recommended Citation
Shved, Lyudmila, "A locus construction in the hyperbolic plane for elliptic curves with cross-ratio on the unit circle" (2011). Theses Digitization Project. 3867.
https://scholarworks.lib.csusb.edu/etd-project/3867