SMS scnews item created by Stephan Tillmann at Thu 9 Oct 2014 1016
Type: Seminar
Distribution: World
Expiry: 8 Jan 2015
Calendar1: 15 Oct 2014 1100-1200
CalLoc1: Carslaw 535A
Auth: tillmann@p710.pc (assumed)

Geometry-Topology-Analysis Seminar

Sections of Surface Bundles

Jonathan Hillman (Sydney)

GTA Seminar - Wednesday, 15 October, 11:00-12:00 in Carlaw 535A

Sections of Surface Bundles

An $F$ -bundle $p : E \to B$ is a continuous map with fibres $p^{- 1} (b)$ homeomorphic to $F$ , for all $b \in B$ , and which is locally trivial: the base $B$ has a covering by open sets $U$ over each of which $p$ is equivalent to the obvious projection of $U \times F$ onto $U$ . (Thus $p$ is a family of copies of $F$ , parametrized by $B$ .)

We shall assume that $B$ and $F$ are closed aspherical surfaces. Such bundles are then determined by the associated fundamental group extensions $1 \to π_{1} (F) \to π_{1} (E) \to π_{1} (B) \to 1.$ We review this connection, and consider when such a bundle $p$ has a section, i.e., a map $s : B \to E$ such that $p s = i d_{B}$ . If time permits we may say something about recent work by Nick Salter on the extent to which $π_{1} (E)$ alone determines the bundle.

Please join us for lunch after the talk!