The universal surface bundle over the Torelli space has no sections

Abstract

For g>3, we give two proofs of the fact that the Birman exact sequence for the Torelli group \[ 1 π1(Sg) Ig,1 Ig 1 \] does not split. This result was claimed by G. Mess in mess1990unit, but his proof has a critical and unrepairable error which will be discussed in the introduction. Let UIg,nTu'g,n BIg,n (resp. UPIg,nTug,n BPIg,n) denote the universal surface bundle over the Torelli space fixing n points as a set (resp. pointwise). We also deduce that Tu'g,n has no sections when n>1 and that Tug,n has precisely n distinct sections for n 0 up to homotopy.