A note on the fundamental group of Kodaira fibrations

Abstract

The fundamental group π of a Kodaira fibration is, by definition, the extension of a surface group b by another surface group g, i.e. \[ 1 → g → π → b → 1. \] Conversely, we can inquire about what conditions need to be satisfied by a group of that sort in order to be the fundamental group of a Kodaira fibration. In this short note we collect some restriction on the image of the classifying map m b g in terms of the coinvariant homology of g. In particular, we observe that if π is the fundamental group of a Kodaira fibration with relative irregularity g-s, then g ≤ 1+ 6s, and we show that this effectively constrains the possible choices for π, namely that there are group extensions as above that fail to satisfy this bound, hence cannot be the fundamental group of a Kodaira fibration. In particular this provides examples of symplectic 4--manifolds that fail to admit a K\"ahler structure for reasons that eschew the usual obstructions.