I consider a Lie group $G$, with a group element $g$ parametrised in some manner with parameter $\theta_i$, $i=1,\cdots, \dim G$. Suppose that $K\subset G$. I want to compute the variation of an group element under the left action of $K$ on $G$.
I'm a little confused to how I can do this: Something like $\delta g =g\delta\theta_iT^i$, with $T^i$ the generators of $G$? but restricted to the subgroup $K$?
Let's say $T^i$ ($i = 1, \dots, \dim G$) are the generators of $G$ chosen in such a way that $T^\mu$ ($\mu = 1, \dots, \dim K$) are the generators of $K \subset G$.
Let $k \in K$ and $g \in G$, then the left action of $k$ on $g$ is just $g' = k g$. Parametrize $k = \exp( \delta \theta_\mu T^\mu )$ then $g' = (1 + \delta \theta_\mu T^\mu) g$, so I would say $\delta g = \delta \theta_\mu T^\mu g$.