Let $G$ be a Lie group, and let $\mathcal B(G)$ its Borel $\sigma$-algebra. Suppose that $f : G \to G$ is a Borel-measurable homomorphism. Is $f$ smooth?
Edit: My original question said "measurable function" instead of the more accurate "measurable homomorphism." Marc Palm and other people answered both questions very nicely:
No, take a proper closed set $X$ and define $f|X = 1$ and $f|G-X = g \neq 1$.
If you consider $f$ to be a group homomorphism, then the answer is yes in general.
Perhaps it is interesting to know that for group cocycles the answer is in general no (even up to coboundaries). For instance the extension $\mathbb{Z} \to \mathbb{R} \to S^1$ is described by a 2-cocycle $S^1 \times S^1 \to \mathbb{Z}$ that is measurable, but this cannot be chosen to be smooth or continuous.
Probably you impose some algebraic structure on your function $f$, like $f$ is a homomorphism, no? Since your question reminds me similar results on the additive measurable function on $\mathbb{R}$.
Not every measurable function on the real line is continuous, let along smooth. Real line is a perfectly nice Lie group.
