Covariant Compactification: progress towards a TOE(F) – Part 2
This is the second episode of my explanation of how, from a study of geometric quantities describing curvature on 10-dimensional spacetime, one can get (among other things):
- quarks and leptons;
- a derivation of Einstein’s field equation with a new interpretation, in which it’s an identity (rather than needing to be postulated or derived from an action);
- a covariant generalisation of Poisson’s equation for gravity;
- Heisenberg’s uncertainty principle;
- the gluon gauge potential and its Wilson loops;
- and, in general, all matter and all its interactions being aspects of the geometry of curved 10-dimensional spacetime.