Let $\pi: M\to B$ be a fiber bundle of smooth manifolds with $B$ connected and each fiber of $\pi$ is a compact manifold. Let $G$ be a compact Lie group acting smoothly on $M$ such that $\pi(g\cdot m)=\pi(m)$. It is clear that $G$ acts smoothly on each fiber $M_b$ for $b\in B$. Noe fix a $g\in G$...