How to contract spinor indices?

Question

In normal vector representation, vectors can be contracted as follows: $$v^\mu v_\mu$$

with one covariant and one contravariant index. But in spinor representation, there are 4 possible type of indices:

$$\psi^{a} $$ $$ \psi^{\dot{a}} $$ $$ \psi_a $$ $$ \psi_{\dot{a}}$$

How do I contract them?

Also, a vector is a rank-2 spinor as the following: $v^{a \dot{b}}$, so is a covariant vector like this: $u_{\dot{a}b}$? What about $w^{a}_{\dot{b}}$ and other countless ways I can construct a rank-2 spinor?

Answer 1

1. Undotted upper and lower indices can be contracted. Undotted indices are raised and lowered with the Levi-Civita symbol/tensor $\epsilon_{ab}$.

2. Dotted indices work similarly. Dotted indices are raised and lowered with $\epsilon_{\dot{a}\dot{b}}$.

3. For more information, see e.g. this & this Phys.SE posts.