Title of article
The Hyperbolic Derivative in the Poincar´e Ball Model of Hyperbolic Geometry
Author/Authors
Graciela S. Birman1، نويسنده , , Abraham A. Ungar، نويسنده ,
Issue Information
دوهفته نامه با شماره پیاپی سال 2001
Pages
13
From page
321
To page
333
Abstract
The generic M¨obius transformation of the complex open unit disc induces a
binary operation in the disc, called the M¨obius addition. Following its introduction,
the extension of the M¨obius addition to the ball of any real inner product space
and the scalar multiplication that it admits are presented, as well as the resulting
geodesics of the Poincar´e ball model of hyperbolic geometry. The M¨obius gyrovector
spaces that emerge provide the setting for the Poincar´e ball model of hyperbolic
geometry in the same way that vector spaces provide the setting for Euclidean
geometry. Our summary of the presentation of the M¨obius ball gyrovector spaces
sets the stage for the goal of this article, which is the introduction of the hyperbolic
derivative. Subsequently, the hyperbolic derivative and its application to geodesics
uncover novel analogies that hyperbolic geometry shares with Euclidean geometry.
Journal title
Journal of Mathematical Analysis and Applications
Serial Year
2001
Journal title
Journal of Mathematical Analysis and Applications
Record number
932453
Link To Document