Paper Info
Title
Projective and affine symmetries and equivalences of rational and polynomial surfaces.
Abstract
It is known, that proper parameterizations of rational curves in reduced form are unique up to bilinear reparameterizations, i.e., projective transformations of its parameter domain. This observation has been used in a series of papers by Alcázar et al. to formulate algorithms for detecting Euclidean equivalences and symmetries as well as similarities. We generalize this approach to projective equivalences of rationally parametrized surfaces. More precisely, we observe that a birational base-point free parameterization of a surface is unique up to projective transformations of the domain. Furthermore, we use this insight to find all projective equivalences between two given surfaces. In particular, we formulate a polynomial system of equations whose solutions specify the projective equivalences, i.e., the reparameterizations associated with them.
Year
DOI
Venue
2019
10.1016/j.cam.2018.06.026
Journal of Computational and Applied Mathematics
Keywords
Field
DocType
Projective equivalences,Symmetry detection,Rational surface,Polynomial system,Linear reparameterization
Affine transformation,System of linear equations,Polynomial,Mathematical analysis,Quadratic equation,Pure mathematics,Euclidean geometry,Homogeneous space,Mathematics,Bilinear interpolation,Projective test
Journal
Volume
ISSN
Citations 
349
0377-0427
3
PageRank 
References 
Authors
0.41
12
3
Name
Order
Citations
PageRank
Michael Hauer170.88
Bert Jüttler2114896.12
Josef Schicho312121.43