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Point
A 0-Dimensional Space is a space in which every position can be described in a point. In other words, there is only one possible position in zero dimensional space, so no information is needed to describe the location.

Strictly, a zero dimensional space will have no time or space so it will be in a fixed and single state, though sometimes spaces with some time dimensions (such as 0+1 dimensional space) are considered to be zero-dimensional.

A verse that is zero dimensional is called a Pointverse.

See Also

Dimensionality Negative First Zeroth First Second Third Fourth Fifth Sixth Seventh Eighth Ninth Tenth Eleventh Twelfth Thirteenth Fourteenth Fifteenth Sixteenth ... Omegath
-verse Nullverse Pointverse Lineverse Planeverse Realmverse Fluneverse Pentrealmverse Hexealmverse Heptealmverse Octealmverse Ennealmverse Decealmverse Hendecealmverse Dodecealmverse Tridecealmverse Tetradecealmverse Pentadecealmverse Hexadecealmverse ... Omegealmverse
Hyperbolic space

$ \mathbb H^{n} $

Null polytope

$ \emptyset $

Point

$ \mathbb H^{0} $

Hyperbola

$ \mathbb H^{1} $

Hyperbolic plane

$ \mathbb H^{2} $

Hyperbolic realm

$ \mathbb H^{3} $

Hyperbolic flune

$ \mathbb H^{4} $

Hyperbolic pentrealm

$ \mathbb H^{5} $

Hyperbolic hexealm

$ \mathbb H^{6} $

Hyperbolic heptealm

$ \mathbb H^{7} $

Hyperbolic octealm

$ \mathbb H^{8} $

Hyperbolic ennealm

$ \mathbb H^{9} $

Hyperbolic decealm

$ \mathbb H^{10} $

Hyperbolic hendecealm

$ \mathbb H^{11} $

Hyperbolic dodecealm

$ \mathbb H^{12} $

Hyperbolic tridecealm

$ \mathbb H^{13} $

Hyperbolic tetradecealm

$ \mathbb H^{14} $

Hyperbolic pentadecealm

$ \mathbb H^{15} $

Hyperbolic hexadecealm

$ \mathbb H^{16} $

... Hyperbolic omegealm

$ \mathbb H^{\aleph_0} $

Euclidean space

$ \mathbb R^{n} $

Null polytope

$ \emptyset $

Point

$ \mathbb R^{0} $

Euclidean line

$ \mathbb R^{1} $

Euclidean plane

$ \mathbb R^{2} $

Euclidean realm

$ \mathbb R^{3} $

Euclidean flune

$ \mathbb R^{4} $

Euclidean pentrealm

$ \mathbb R^{5} $

Euclidean hexealm

$ \mathbb R^{6} $

Euclidean heptealm

$ \mathbb R^{7} $

Euclidean octealm

$ \mathbb R^{8} $

Euclidean ennealm

$ \mathbb R^{9} $

Euclidean decealm

$ \mathbb R^{10} $

Euclidean hendecealmverse

$ \mathbb R^{11} $

Euclidean dodecealmverse

$ \mathbb R^{12} $

Euclidean tridecealm

$ \mathbb R^{13} $

Euclidean tetradecealm

$ \mathbb R^{14} $

Euclidean pentadecealm

$ \mathbb R^{15} $

Euclidean hexadecealm

$ \mathbb R^{16} $

... Euclidean omegealm

$ \mathbb R^{\aleph_0} $

Hypersphere

$ \mathbb S^{n} $

Null polytope

$ \emptyset $

Point pair

$ \mathbb S^{0} $

Circle

$ \mathbb S^{1} $

Sphere

$ \mathbb S^{2} $

Glome

$ \mathbb S^{3} $

Tetrasphere

$ \mathbb S^{4} $

Pentasphere

$ \mathbb S^{5} $

Hexasphere

$ \mathbb S^{6} $

Heptasphere

$ \mathbb S^{7} $

Octasphere

$ \mathbb S^{8} $

Enneasphere

$ \mathbb S^{9} $

Dekasphere

$ \mathbb S^{10} $

Hendekasphere

$ \mathbb S^{11} $

Dodekasphere

$ \mathbb S^{12} $

Tridekasphere

$ \mathbb S^{13} $

Tetradekasphere

$ \mathbb S^{14} $

Pentadekasphere

$ \mathbb S^{15} $

Hexadekasphere

$ \mathbb S^{16} $

... Omegasphere

$ \mathbb S^{\aleph_0} $