MASS DILATION SPHERE

Cambridge , Massachusetts

A sufficiently compact mass will deform space to form a black hole. The project was developed in hopes to derive a volumetric response to the effects of gravity.

Calculated modules represent spatial vectors that quantify the relationship between a mass and its gravitational component. The sphere becomes a visual coding of natural phenomena.

Rules for achieving the Singularity

1. A surface, regardless of the range of magnitude, will project to the center of a sphere.

2. Each resultant projected volume will be cut by a circle radiating a distance from the origin, proportional to the magnitude of their individual surface areas.

3. The altered projections will then be subject to a surface offset, a simulation of the gravity effect on mass concentration. These offsets will vary proportionally based on the initial surface areas.

4. Each edge will only make contact with half the number of modules as squares making up each originating module.*

*Accommodations:

a.) The juxtaposition of two or more of the same micro modules can act as a module in the counting of adjacent surface modules.

b.) A macro module will seek to only be made by eight or fewer micro modules.