Related to my question here (spacetime torsion, the spin tensor, and intrinsic spin in einstein cartan theory), I'd like to be able to put test particles on a manifold with non-zero torsion and see how this affects the motion.
The action for a free particle is usually given as:
$$S_{free} = -m\int d\tau = - m\int \sqrt{\frac{\partial x^\mu(\lambda)}{\partial \lambda}\frac{\partial x^\nu(\lambda)}{\partial \lambda}g_{\mu\nu}(\lambda)}\ \ d\lambda$$ where $\tau$ is the world line length, and $\lambda$ is some parameter to describe the particle path $x^\mu(\lambda)$. I assume this is a scalar particle, since rotations will not affect its description.
- Is there a term I am leaving out if we consider non-zero torsion?
- What is the corresponding model for a free spinor particle? (I've seen classical spinor fields discussed, but never a particle)
- What about for higher spin?
- What about for arbitrary spin? (or even in classical models, are we limited to representations of the manifold tangent space?)
