English

Big Torelli groups: generation and commensuration

Geometric Topology 2020-03-12 v3 Group Theory

Abstract

For any surface Σ\Sigma of infinite topological type, we study the Torelli subgroup I(Σ){\mathcal I}(\Sigma) of the mapping class group MCG(Σ){\rm MCG}(\Sigma), whose elements are those mapping classes that act trivially on the homology of Σ\Sigma. Our first result asserts that I(Σ){\mathcal I}(\Sigma) is topologically generated by the subgroup of MCG(Σ){\rm MCG}(\Sigma) consisting of those elements in the Torelli group which have compact support. In particular, using results of Birman, Powell, and Putman we deduce that I(Σ){\mathcal I}(\Sigma) is topologically generated by separating twists and bounding pair maps. Next, we prove the abstract commensurator group of I(Σ){\mathcal I}(\Sigma) coincides with MCG(Σ){\rm MCG}(\Sigma). This extends the results for finite-type surfaces of Farb-Ivanov, Brendle-Margalit and KIda to the setting of infinite-type surfaces.

Keywords

Cite

@article{arxiv.1810.03453,
  title  = {Big Torelli groups: generation and commensuration},
  author = {Javier Aramayona and Tyrone Ghaswala and Autumn E. Kent and Alan McLeay and Jing Tao and Rebecca R. Winarski},
  journal= {arXiv preprint arXiv:1810.03453},
  year   = {2020}
}

Comments

Made changes suggested by the referee. To appear in Groups, Geometry, and Dynamics

R2 v1 2026-06-23T04:32:06.534Z