Conformal transformations of space-time as vector bundle automorphisms
| Abstract | Conformal group of Minkowski space-time M is considered as a group of bundle automorphisms of a vector bundle U over M. 4-component spin-vectors (4-spinors) are sections of a subbundle of the tangent bundle over U. Isotropic 4-vectors are images of 4-spinors under projection. This leads to a particularly clear interpretation of the spin properties of Nature. | |||||||||
| Keywords | No keywords specified (fix it) | |||||||||
| Categories | No categories specified (fix it) | |||||||||
| Options |
|
|||||||||
Download options| PhilPapers Archive |
Upload a copy of this paper Check publisher's policy on self-archival Papers currently archived: 5,711 |
| External links | This entry has no external links. Add one. |
| Through your library | Only published papers are available at libraries |
Similar books and articlesAlastair Wilson (2009). Disposition-Manifestations and Reference-Frames. Dialectica 63 (4):591-601.
Jiri Benovsky (2009). The Self : A Humean Bundle and/or a Cartesian Substance ? European Journal of Analytic Philosophy 5 (1).
Iraj Kalantari & Allen Retzlaff (1977). Maximal Vector Spaces Under Automorphisms of the Lattice of Recursively Enumerable Vector Spaces. Journal of Symbolic Logic 42 (4):481-491.
Eiko Isoda (1997). Kripke Bundle Semantics and C-Set Semantics. Studia Logica 58 (3):395-401.
Michael Esfeld & Vincent Lam (2006). Moderate Structural Realism About Space-Time. Synthese 160 (1):27 - 46.
Analytics
Monthly downloads
Sorry, there are not enough data points to plot this chart.
|
Added to index2009-01-28Total downloads0Recent downloads (6 months)0How can I increase my downloads? |
My notes
Discussion
