Lets cube of S^3 dimensions belong to geometry group A|A: Group B|B contains another cube l, if variable combination is l1....l nth. The combination s|S mapping group is mapped with in the form s|S|A+s|A:S^3 where S class is isometric and equal universally as a geometric potential for open groups. Under a continous basis Vt:v, continous basis of cube surface elements is continous as Vt:v|S:S^2 assigned surface LT: whereas, LT surface defined LT surface area sphere: close surface if surface change overlaps or multiple overlapping surface. A surface lattice can be created in LT surface basis in number of degrees as:
A|A :LT: A|A
(A|A :LT: A|A) :LT: (A|A :LT: A|A) +S^3
In terms of inclusive dimensionality, we get:
S^3|S:S|S^3|S:sv
For 0 dimensionality projection basis: |0|^3: |||: -S
In sequence dimensionality can be described as for 0|z : Z -S^3 Z S:0 Z 0 with the system decribing a a cube surface with S potentillay being 0.
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