English

Mapping class groups, multiple Kodaira fibrations, and CAT(0) spaces

Geometric Topology 2021-07-05 v3 Algebraic Geometry Complex Variables Group Theory

Abstract

We study several geometric and group theoretical problems related to Kodaira fibrations, to more general families of Riemann surfaces, and to surface-by-surface groups. First we provide constraints on Kodaira fibrations that fiber in more than two distinct ways, addressing a question by Catanese and Salter about their existence. Then we show that if the fundamental group of a surface bundle over a surface is a CAT(0){\rm CAT}(0) group, the bundle must have injective monodromy (unless the monodromy has finite image). Finally, given a family of closed Riemann surfaces (of genus 2\ge 2) with injective monodromy EBE\to B over a manifold BB, we explain how to build a new family of Riemann surfaces with injective monodromy whose base is a finite cover of the total space EE and whose fibers have higher genus. We apply our construction to prove that the mapping class group of a once punctured surface virtually admits injective and irreducible morphisms into the mapping class group of a closed surface of higher genus.

Keywords

Cite

@article{arxiv.2001.03694,
  title  = {Mapping class groups, multiple Kodaira fibrations, and CAT(0) spaces},
  author = {Claudio Llosa Isenrich and Pierre Py},
  journal= {arXiv preprint arXiv:2001.03694},
  year   = {2021}
}

Comments

32 pages, v3. The order of the sections has changed. This is the final version, to be published by Math. Annalen

R2 v1 2026-06-23T13:08:30.390Z