¶ Omnitopology
← Omnitopology | Omnitopology →
Index Entry
Omnitopology:
“Omnitopology differs from Euler’s superficial topology in that it extends its concerns to the topological domains of non-nuclear closest-packed spherical arrays and with the domains of the non-nuclear-containing polyhedra thus formed. Omnitopology is concerned, for instance, with the individually unself-identifying concave octahedra and concave vector equilibria volumetric space domains betweeningly defined within the closest-packed sphere complexes; as well as with the individually self-identifying convex octahedra and convex vector equilibria, which latter are spontaneously singled out by the observer’s optical comprehendibility as the finite integrities and entities of the locally and individual-spherically-closed systems dividing all the Universe into all the macrocosmic outsideness and all the microcosmic insideness of the observably closed, finite, local systems-- in contradistinction to the undefinability of the omnidirectional space nothingness frequently confronting the observer.”
¶ Citations
