Verse and Dimensions Wikia
Verse and Dimensions Wikia
Advertisement
Verse and Dimensions Wikia

The omegasphere is a countably-infinite dimensional analogue of the hypersphere. It can be constructed by taking the set of all points that are the same distance from another point in the space of real sequences or by taking the union of all finite positive dimensional spheres.[1]

The solid interior of the omegasphere is called the omegaball.

References[]

See Also[]

Dimensionality Negative One Zero One Two Three Four Five Six Seven Eight Nine Ten ... Aleph null
Hyperbolic space

Hyperbolic plane

Hyperbolic realm

Hyperbolic flune

Hyperbolic pentrealm

Hyperbolic hexealm

Hyperbolic heptealm

Hyperbolic octealm

Hyperbolic ennealm

Hyperbolic decealm

... Hyperbolic omegealm

Euclidean space

Null polytope

Point

Euclidean line

Euclidean plane

Euclidean realm

Euclidean flune

Euclidean pentrealm

Euclidean hexealm

Euclidean heptealm

Euclidean octealm

Euclidean ennealm

Euclidean decealm

... Euclidean omegealm

Hypersphere

Point pair

Circle

Sphere

Glome

Tetrasphere

Pentasphere

Hexasphere

Heptasphere

Octasphere

Enneasphere

Dekasphere

... Omegasphere

Advertisement