Fredrik said:
A spinor field is a section of...some other kind of vector(?) bundle over spacetime. I'm embarrassed to admit that I don't know how it's defined. Perhaps someone else can tell both of us.
It's a little bit tricky. It can be done in several ways. For instance:
Let L be the connected component of the identity of the Lorentz group. Suppose we have spacetime M that is oriented and time oriented. Its orthonormal frames bundle is a principal bundle with L as its structure group. So far so good. We know we have 2:1 homomorphism SL(2,C) -> L.
We say that M admits spin structure if there exists an SL(2,C) bundle Of "spin frames" and 2:1 bundle morphism onto the orthonormal bundle that commutes with the group action. That is when you rotate spin frame by an SL(2,C) matrix A, then the corresponding to it Lorentz frame rotates by the corresponding Lorentz transformations.
There are theorems telling us which spacetimes admit spin structures and how many inequivalent. Now once you have spin frames - you define spinors as sections of associated vector bundles.
This is one method. Another method is to construct Clifford algebra bundle over spacetime and then look for for vector bundles that are "modules" for the Clifford algebra bundle. That is for vector bundles fibers of which are representations spaces for the Clifford algebra fibers. This is how physicists do it - using gamma matrices and their commutation relations without a priori specifying the space on which these matrices act.
Finally there is a third method - searching for spinor bundle as a subbundle of the Clifford algebra bundle - it should consist of "minimal ideals".
In each of these cases it is difficult to find a
universal and constructive method of defining spinors, a method that would be valid for all topologically fancy spacetimes. At least I do not know such a method.
