Particle Knots in Toric Modular Space

@article{Wet2014ParticleKI,
  title={Particle Knots in Toric Modular Space},
  author={J. A. de Wet},
  journal={Bulletin of Mathematical Sciences and Applications},
  year={2014},
  volume={9},
  pages={45-48}
}
  • J. Wet
  • Published 4 August 2014
  • Physics
  • Bulletin of Mathematical Sciences and Applications
The goal of this contribution is to relate quarks to knots or loops in a 6-space CP 3 that then collapses into a torus in real 3-space P 3 instantaneously after the Big Bang, and massive inflation, when 3 quarks unite to form nucleons. 
3 Citations
ICOSAHEDRAL SUPERSYMMETRY AND DARK MATTER
  • J. Wet
  • Physics, Mathematics
  • 2015
The Icosahedral group has the Lie algebra E8 with a graph of 240 vertices and one real and 2 complex forms as well as a non-compact Split Form EVIII that is infinite-dimensional and shown to have 42
ICOSAHEDRAL SYMMETRY : A REVIEW
This Review covers over 40 years of research on using the algebras of Quarternions E6, E8 to model Elementary Particle physics. In particular the Binary Icosahedral group is isomorphic to the
ICOSAHEDRAL SYMMETRY : A REVIEW
This Review covers over 40 years of research on using the algebras of QuarternionsE6;E8 to model Elementary Particle physics. In particular the Binary Icosahedral group is isomorphic to the

References

SHOWING 1-10 OF 12 REFERENCES
Zakopane lectures on loop gravity
This is a first version of the introductory lectures on loop quantum gravity that I will give at the quantum gravity school in Zakopane. The theory is presented in self-contained form, without
Knots on a Torus: A Model of the Elementary Particles
Two knots; just two rudimentary knots, the unknot and the trefoil. That’s all we need to build a model of the elementary particles of physics, one with fermions and bosons, hadrons and leptons,
Loop Quantum Gravity
  • C. Rovelli
  • Physics
    Living reviews in relativity
  • 2008
TLDR
An overview of ideas, techniques, results and open problems of this candidate theory of quantum gravity is given, and a guide to the relevant literature is given.
Knot theory and its applications
This book introduces the study of knots, providing insights into recent applications in DNA research and graph theory. It sets forth fundamental facts such as knot diagrams, braid representations,
Group theory for unified model building
Hessian polyhedra, invariant theory and Appell hypergeometric partial differential equations
It is well-known that Klein's lectures on the icosahedron and the solution of equations of fifth degree is one of the most important and influential books of 19th-century mathematics. In the present
Abelian surfaces of type (1,4)
pair (dl, d2) is called the type of L. According to Riemann R o c h h~ did2 and L induces a rational map cpL:A~ Pn,d2-t. We want to study this map in the special case (dl, d2) = (1, 4). Let us first
Determining the Muon Mass in an Instructional Laboratory
An instructional laboratory experiment to measure the muon mass is described. Using coincidence-anticoincidence detection, the decay of a cosmic-ray muon into an electron (or positron) is observed in
Regular Complex Polytopes
Frontispiece Preface to the second edition Preface to the first edition 1. Regular polygons 2. Regular polyhedra 3. Polyhedral kaleidoscopes 4. Real four-space and the unitary plane 5. Frieze
...
1
2
...