Given a homeomorphism of two open subsets of $\mathbb{R}^n$ ($n \leq 3$), is there a natural way to smooth it out to get a diffeomorphism?

Question

It is well known that topological manifolds of dimension $\leq 3$ admit a unique smooth structure. In particular, homeomorphic open subsets of $\mathbb{R}^n$ are diffeomorphic for $n \leq 3$.

So my question is: given a homeomorphism $h:U \rightarrow V$ with $U, V \subset \mathbb{R}^n$, $n \leq 3$ open, is there a natural way to "smooth" it out to get a diffeomorphism?

Answer 1

The question asks, in particular, if there is a "natural" map from $Homeo(\mathbb{R})$ to $Diff(\mathbb{R})$. "Natural" should probably imply "continuous" and identity on smooth maps. Then the standard topological fact about retracts implies that such a map does not exist.