¶ Domain & Quantum (1)
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Index Entry
The unique insideness domain of a prime system is, in turn, a prime volumetric domain, which is always conceptually defined by the system’s topological vertex-interconnecting lines and the areas finitely enclosed by those lines (V + F = L + 2.) Prime volumetric domain provides space definition independent of size.
Prime volumetric domain and prime areal domain together provide space conceptuality independent of size, just as the tetrahedron provides prime structural system conceptuality independent of size.
Complex bubble aggregates are partitioned into prime volumetric domains by interiorly subdividing prime areal domains as flat drawn membranes.
A prime volumetric domain has no volumetric nucleus. A prime areal domain has no planar nucleus. So we have prime system volumetric domains and prime system areal domains and linear interconnections of all vertexes-- all with complete topological conceptual interpatternning integrity utterly independent of size.
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