¶ Prime Enclosure
← Prime Domains | Prime Enclosure →
Index Entry
“Omnitopology describes prime volumes. Prime volume domains are described by Euler’s minimum set of visually unique topological aspects of polyhedral systems. Systems divide all Universe into all of the Universe occurring outside the system, all of the Universe occurring inside the system, and the remainder of the Universe constituting the system itself. Any point or locus inherently lacks insideness. Two event points cannot provide enclosure. Two points have betweenness but not insideness. Three points cannot enclose. Three points describe a volumeless plane. Three points have betweenness but no insideness. A three-point array plus a fourth point which is not in the plane described by the first three points constitutes prime enclosure. It requires a minimum of four points to definitively differentiate cosmic insideness and outsideness, i.e., to differentiate macrocosm from microcosm, and both of them from here and now.”
¶ Citations
