Authors: S. Halayka
Using a numerical method, the external directed edges of a complete graph are tested for their level of fitness in terms of how well they form a radially symmetric field at long distance (e.g., a test for the inverse square law in 3D space). It is found that the external directed edges of a complete graph can very nearly form a radially symmetric field at long distance if the number of graph vertices is great enough.
Comments: 7 Pages. Added reference McDonald JR, Miller WA. Coupling Non-Gravitational Fields with Simplicial Spacetimes
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