Calabi-Yau Manifold E8 Gosset Lattice
laser etched glass | 80x80mm

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Calabi-Yau Manifold E8 Gosset Lattice
laser etched glass | 80x80mm
The Director of Quantum Gravity Research in Los Angeles,Klee Irwin, shares his mission to discover the geometric first-principles unification of space, time, energy, matter, information and consciousness. His work with a group of physicists and mathematicians has developed an E8 quasicrystal quantum gravity framework based on the golden ratio and the Fibonacci chains.
Is E8 Lattice the True Nature of Reality? Or Theory of Everything?
🤓 Visualizing a Hypothetical Planck Scale Substructure of Reality
💥 Geometer, animator and Quantum Gravity Research scientist Dugan Hammock displays some of his work visualizing the quasicrystalline point space on which we model our physics. This 3D point space which we call the QSN (Quasicrystalline Spin Network) is derived from a 4D quasicrystalline point space called the Elser-Sloane quasicrystal, which is a projection to 4D of the E8 lattice at a particular angle.
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Ray discusses the observer space in 'E8 Shelling By Seven-Spheres' video.
" ...recently, I was also interested in the E8 sphere shelling, which is one of the first ways that was used by Jean-Francois Sadoc & Rémy Mosseri around twenty years ago, to build the Elser-Sloane quasicrystal using discrete Hopf fibration. And here we see the circle which has shells of E8, with a beautiful symmetry, we are able to group points together on the lattice, and they will group in shells in the quasicrystal."
PREVIOUS BLOG POST (which includes link to Derek Wise paper 'Lifting general relativity to observer space' mentioned in the video.) http://kleeirwindeepthoughts.blogspot.com/2017/06/e8-shelling-by-seven-spheres.html
Fang Fang, research scientist at Quantum Gravity Research, shows how the 57-Group--a structure that we propose as a quasiparticle--is constructed, and demonstrates how this quasiparticle can propagate along the "Hopf" loops in a 4D quasicrystal known as the Elser-Sloane quasicrystal, which is derived via a cut-and-project method of projection from the E8 lattice.
✔️ Watch 'Projecting the 8-Dimensional E8 Lattice to 4D' video
✔️ Explore Projective Geometry
In this video, researcher Raymond Aschheim explains how we project geometrical objects from a higher dimension to a lower one, and specifically how we project the 8-dimensional E8 lattice to a 4D quasicrystal, also known as the Elser-Sloane quasicrystal.
VIDEO LINK: https://youtu.be/01x7tXZ9yN8
We present the emergence of a root system in six dimensions from the tetrahedra of an icosahedral core known as the 20-group (20G) within the framework of Clifford’s geometric algebra. Consequently, we establish a connection between a three-dimensional icosahedral seed, a six-dimensional (6D) Dirichlet quantized host and a higher dimensional lattice structure. The 20G, owing to its icosahedral symmetry, bears the signature of a 6D lattice that manifests in the Dirichlet integer representation. We present an interpretation whereby the three-dimensional 20G can be regarded as the core substratum from which the higher dimensional lattices emerge. This emergent geometry is based on an induction principle supported by the Clifford multi-vector formalism of three-dimensional (3D) Euclidean space. This lays a geometric framework for understanding several physics theories related to S U ( 5 ) , E 6 , E 8 Lie algebras and their composition with the algebra associated with the even unimodular lattice in R 3 , 1 . The construction presented here is inspired by Penrose’s three world model.