Classification of surface bundles over surfaces

Question

Can anyone recommend one place or a few places that describe what is known about the classification of (real) surface bundles over (real) surfaces?

Now, if the fibre F and the base B are both Hausdorff and paracompact surfaces, then:

What is the classification of F bundles over the base B ? ...

... where F and/or B may or may not be compact ...

and:

a) the group of the bundle is Diff^∞(F),

or

b) F and B are fixed Riemann surfaces and the group of the bundle is the group of conformal automorphisms of F

?

c) Ideally, it would be good to know the mixed cases where F is C^∞ and B is a Riemann surface, as well as vice versa.

Answer 1

For a), when $\chi(F)<0$ $F$-bundles over $B$ are classified by maps $\pi_1(B)\to Mod(F)$, where $Mod(F)$ is the mapping class group of $F$. This boils down to the fact that $Diff_0(F)$ is contractible, which was proved by Earle-Eells in the compact case and Yagasaki in the non-compact case.

The point is that $F$-bundles are classified by homotopy classes of maps $B\to BDiff(F)$. We have a fibration $$Diff(F) \to EDiff(F) \to BDiff(F).$$ Since $Diff(F)\simeq Mod(F)$, $BDiff(F)\simeq BMod(F) \simeq K(Mod(F),1) $. And homotopy classes of maps $B\to K(Mod(F),1)$ are in bijection with homomorphisms $\pi_1(B)\to Mod(F)$.

For the other cases when $\chi(F)\geq 0$, the homotopy type of $BDiff(F)$ is known, eg Smale showed that $Diff(S^2)\simeq O(3)$.

Answer 2

I wrote some papers recently with Campagnolo, Ranicki and Rovi on this subject. Please see MR3892239 and MR4104487. The references in those point you to many more interesting (sic) papers on the subject.

Answer 3

About 6 years ago there was an Oberwolfach meeting on surface bundles, and most of the talks were recorded and can be seen here. If I remember correctly, Benson Farb’s overview talk was particularly good.