On the smoothness of transition functions

Question

Let $p:E \longrightarrow M$ be a smooth fibre bundle, with standard fibre space $F$ and $G$ a Lie group acting effectively on $F$ as a structure group.

Then, are the transition functions always smooth?

I mean, if for every open $U\subseteq M$ and function $g:U \longrightarrow G$ such that the function: $$ H:U\times F \longrightarrow U \times F$$ $$ H(x,s)=(x,g(x)\cdot s)$$ It's a diffeomorphism. Then, does it follow that $g$ is smooth?

PS: In Michor's book, natural operators in differential geometry, I read a similar fact in the step 5 of 9.11, but I don't see why it's true. https://www.mat.univie.ac.at/~michor/kmsbookh.pdf

Answer 1

It is true but tricky to prove; I can't think of a reference off hand. You want to know that that an effective Lie group action allows one to smoothly determine each element $g$ by knowing ``how it acts''. You can prove this by thinking about the action of $G$ on the bundle of jets of local coordinates. The effectiveness, and analyticity of a Lie group acting on a homogenous space, ensures that if you take high enough jets, the stabilizer is trivial. That ensures that you can solve for an element $g$ uniquely and smoothly if you are giving the information of what $g$ does to a high enough jet.

Answer 2

About step 5 in 9.11:

The first line of the display in step 5 gives a formula for the transition functions involving mappings $x\mapsto c^x_{\alpha}$ which are smooth enough (see 4 lines above this), and parallel transport which is smooth even in the choice of curves (if they depend on finitely many parameters) by theorem 8.9, 5 pages before.