From the paper
Halmos, Paul R., In general a measure preserving transformation is mixing, Ann. Math. (2) 45, 786-792 (1944). ZBL0063.01889.
the following result is known: Let $(E,\Sigma, \mu)$ be a measure space which is isomorphic to the unit interval. And let $G=G(E,\mu)$ be the space of all invertible measure preserving transformations on $(E,\Sigma, \mu)$. Then the subset of $G$ made up of weakly mixing maps is a dense $G_\delta$ set. In particular, from this it follows that the subset of $G$ made up of ergodic maps is a dense $G_\delta$ set.
Question: Can we similarly prove that ergodicity is generic in the set of measure-preserving $C^1$ diffeomorphisms of the circle, $\mathrm{Diff}^1(\mathbb T)$? If yes, what is a good reference for this?
Here by a map $T$ being ergodic I mean: for all $A\in\Sigma$, $$ T(A)=A \quad \Rightarrow \quad \mu(A)=0 \textrm{ or } \mu(A)=1; $$
