General Effective Actions

TL;DR

It is shown that the only possible terms in the Lagrangian density that, although not [ital G] invariant, yield[ital G]-invariant Terms in the action, are in one to one correspondence with the generators of the fifth cohomology classes.

Abstract

We investigate the structure of the most general actions with symmetry group $G$, spontaneously broken down to a subgroup $H$. We show that the only possible terms in the Lagrangian density that, although not $G$-invariant, yield $G$-invariant terms in the action, are in one to one correspondence with the generators of the fifth cohomology classes. For the special case of $G=SU(N)_L \times SU(N)_R$ broken down to the diagonal subgroup $H=SU(N)_V$, there is just one such term for $N\geq 3$, which for $N=3$ is the original Wess-Zumino-Witten term.