Difference between revisions of "Pentaspherical coordinates"
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− | A kind of homogeneous coordinates | + | {{TEX|done}} |
+ | A kind of homogeneous coordinates $x_0:x_1:x_2:x_3:x_4$ for a point $(x)$ in complex inversive space. The numbers $x_\nu$, not all zero, are connected by the relation | ||
− | + | $$(x,x)\equiv x_0^2+x_1^2+x_2^2+x_3^2+x_4^2=0.$$ | |
− | All points | + | All points $(x)$ which satisfy a linear equation |
− | + | $$(y,x)\equiv y_0x_0+y_1x_1+y_2x_2+y_3x_3+y_4x_4=0$$ | |
− | are said to form a [[Sphere|sphere]], with coordinates | + | are said to form a [[Sphere|sphere]], with coordinates $(y)$. Two spheres $(y)$ and $(z)$ are orthogonal if $(y,z)=0$, tangent if |
− | + | $$(y,y)(z,z)-(y,z)^2=0.$$ | |
− | If two spheres | + | If two spheres $(y)$ and $(z)$ intersect, the expression |
− | + | $$\frac{(y,z)}{\sqrt{(y,y)}\sqrt{(z,z)}}$$ | |
measures the cosine of their angle (or the hyperbolic cosine of their inverse distance). | measures the cosine of their angle (or the hyperbolic cosine of their inverse distance). | ||
− | Setting | + | Setting $x_4=0$, one obtains the analogous [[Tetracyclic coordinates|tetracyclic coordinates]], which lead to circles instead of spheres. |
− | Completely analogous constructions can be performed for spaces of higher dimensions, which give polyspherical coordinates. In the | + | Completely analogous constructions can be performed for spaces of higher dimensions, which give polyspherical coordinates. In the $4$-dimensional case they are called hexaspherical coordinates. Polyspherical coordinates are used in conformal geometry in examining manifolds of figures. |
====References==== | ====References==== |
Revision as of 16:26, 15 April 2014
A kind of homogeneous coordinates $x_0:x_1:x_2:x_3:x_4$ for a point $(x)$ in complex inversive space. The numbers $x_\nu$, not all zero, are connected by the relation
$$(x,x)\equiv x_0^2+x_1^2+x_2^2+x_3^2+x_4^2=0.$$
All points $(x)$ which satisfy a linear equation
$$(y,x)\equiv y_0x_0+y_1x_1+y_2x_2+y_3x_3+y_4x_4=0$$
are said to form a sphere, with coordinates $(y)$. Two spheres $(y)$ and $(z)$ are orthogonal if $(y,z)=0$, tangent if
$$(y,y)(z,z)-(y,z)^2=0.$$
If two spheres $(y)$ and $(z)$ intersect, the expression
$$\frac{(y,z)}{\sqrt{(y,y)}\sqrt{(z,z)}}$$
measures the cosine of their angle (or the hyperbolic cosine of their inverse distance).
Setting $x_4=0$, one obtains the analogous tetracyclic coordinates, which lead to circles instead of spheres.
Completely analogous constructions can be performed for spaces of higher dimensions, which give polyspherical coordinates. In the $4$-dimensional case they are called hexaspherical coordinates. Polyspherical coordinates are used in conformal geometry in examining manifolds of figures.
References
[1] | F. Klein, "Vorlesungen über höhere Geometrie" , Springer (1926) |
[2] | G.V. Bushmanova, A.P. Norden, "Elements of conformal geometry" , Kazan' (1972) (In Russian) |
Comments
References
[a1] | M. Berger, "Geometry" , 1–2 , Springer (1987) (Translated from French) |
[a2] | J.L. Coolidge, "A treatise on the circle and the sphere" , Chelsea, reprint (1971) |
Pentaspherical coordinates. Encyclopedia of Mathematics. URL: http://encyclopediaofmath.org/index.php?title=Pentaspherical_coordinates&oldid=15120