FANDOM


A nullverse is the idea that there can be something one step less than a Point/Pointverse. With 0-dimensionality being a single infinitely small, or even sizeless, location, -1 dimensionality would be the absence of any location.

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} $