¶ Omnitopology
← Omnitopology | Omnitopology →
Index Entry
Omnitopology:
“Omnitopology differs from Euler’s superficial topology in that it extends its concerns to the topological domains of 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 concave octahedra and concave vector equilibria volumetric spaces defined within the closest-packed sphere complexes.”
¶ Citations
