co-homorphism
A paradigm which states that an object with external symmetry must by definition have internal symmetry (self-symmetry).
Specifically that there is no self-symmetry without internal dualism (contiguous dualism).
Implies that the bijective (operationally tautological) function is co-imperatively contingent (cotingent).
Self-referentializes a cotingent link between contiguity and asymmetry.
Tarski demonstrated an instance of cohomorphism by showing that all contiguous (conformal) surfaces could create a second identical surface by using points from the original conformal surface.
Specifically that there is no self-symmetry without internal dualism (contiguous dualism).
Implies that the bijective (operationally tautological) function is co-imperatively contingent (cotingent).
Self-referentializes a cotingent link between contiguity and asymmetry.
Tarski demonstrated an instance of cohomorphism by showing that all contiguous (conformal) surfaces could create a second identical surface by using points from the original conformal surface.
Co-homorphism states that metastructure is symmetric; symmetry is internal; internalism (space) is contiguity; contiguity is conformal; conformalism is bijective; bijectivity is co-imperatively contingent (cotingent); and cotingence is asymmetric.