Weierstrass coordinates

A type of coordinates in an elliptic space. Let $M^n$ be an elliptic space obtained by the identification of diametrically-opposite points of the unit sphere $S^n$ in $(n+1)$-dimensional Euclidean space. The Weierstrass coordinates $(x_0 ,\ldots, x_n)$ of a point in $M^n$ are the orthogonal Cartesian coordinates of the point of $S^n$ that corresponds to it. Since the isometric mapping of $M^n$ into $S^n$ is not single-valued, Weierstrass coordinates are defined up to sign. A hyperplane in $M^n$ is given by a homogeneous linear equation

Named after K. Weierstrass, who used these coordinates in his courses on Lobachevskii geometry in 1872.

Comments

These coordinates for elliptic space can be normalized so that

The analogous Weierstrass coordinates for hyperbolic space satisfy

with the same equation for a hyperplane.

References