Difference between revisions of "The Geometry of Light"
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==Abstract== | ==Abstract== | ||
| − | The Trion-Re' is a fundamental structural unit of 3-D space on the basis of which a new geometry of 3-D space can be built: namely, the 3-D space in which no straight lines exist. To account for the curvature of space, this modification shifts the rules for a platonic solid, making the Trion-Re' the sixth such regular solid and a unique structure of space/time. Traditionally, there are five Platonic Solids with congruent angles and equal, flat faces. However, we must modify the rule and include curved surfaces; in which case a new solid emerges more rudimentary than the tetrahedron. Henceforth called the Trion-Re', this new solid is described as follows: 2-vertices, 3-flexible edges, 3-equal faces, an inside and an outside and spin ability. The Trion-Re' can be used to generate new versions of the other five Platonic Solids. | + | The Trion-Re' is a fundamental structural unit of 3-D space on the basis of which a new geometry of 3-D space can be built: namely, the 3-D space in which no straight lines exist. To account for the curvature of space, this modification shifts the rules for a platonic solid, making the Trion-Re' the sixth such regular solid and a unique structure of space/time. Traditionally, there are five Platonic Solids with congruent angles and equal, flat faces. However, we must modify the rule and include curved surfaces; in which case a new solid emerges more rudimentary than the tetrahedron. Henceforth called the Trion-Re', this new solid is described as follows: 2-vertices, 3-flexible edges, 3-equal faces, an inside and an outside and spin ability. The Trion-Re' can be used to generate new versions of the other five Platonic Solids. |
| − | [[Category:Gravity]] | + | [[Category:Scientific Paper|geometry light]] |
| + | |||
| + | [[Category:Gravity|geometry light]] | ||
Latest revision as of 20:02, 1 January 2017
| Scientific Paper | |
|---|---|
| Title | The Geometry of Light |
| Read in full | Link to paper |
| Author(s) | MICHAEL R R EVANS |
| Keywords | Anthropic Theory; Atoms; Convergence; Geometry; Holon; Light; Matter; Membranes; Planck Length; Particle Physics; Platonic Solids; Quantum Gravity; Space/Time; String Theory; Topological Matrix; Trion |
| Published | 2010 |
| Journal | Proceedings of the NPA |
| Volume | 7 |
| No. of pages | 4 |
| Pages | 149-153 |
Read the full paper here
Abstract
The Trion-Re' is a fundamental structural unit of 3-D space on the basis of which a new geometry of 3-D space can be built: namely, the 3-D space in which no straight lines exist. To account for the curvature of space, this modification shifts the rules for a platonic solid, making the Trion-Re' the sixth such regular solid and a unique structure of space/time. Traditionally, there are five Platonic Solids with congruent angles and equal, flat faces. However, we must modify the rule and include curved surfaces; in which case a new solid emerges more rudimentary than the tetrahedron. Henceforth called the Trion-Re', this new solid is described as follows: 2-vertices, 3-flexible edges, 3-equal faces, an inside and an outside and spin ability. The Trion-Re' can be used to generate new versions of the other five Platonic Solids.
