Finite generation, algebraicity, and representation stability for homology of Torelli groups

Abstract

We solve a long-standing problem of whether the homology groups of the Torelli subgroups Igg are finitely generated in stable range. Namely, we prove that the group Hk(Ig;Z) is finitely generated, provided that k g-2. Two main ingredients of our approach are as follows. First, we show that the action of any symplectic transvection tx∈Sp2g(Z) on the homology of Ig satisfies the following unipotency condition: (tx-1)k+1Hk( Ig;Z)=0. The proof of this fact relies on the study of the spectral sequence for the action of Ig on the complex of homologous curves on Σg. The second key ingredient is Tavgen's theorem asserting that the group Sp2g(Z) is boundedly elementarily generated. For homology with coefficients in Q, we further prove that Hk(Ig;Q) is an algebraic Sp2g(Z)-representation in the same stable range k g-2. Kupers and Randal-Williams have obtained a conditional result: they computed the algebraic part of the rational cohomology of Torelli groups in stable range under the assumpition that the rational cohomology groups are finite-dimensional in this stable range. Our results turn this conditional computation into a precise theorem that describes the whole rational cohomology ring of Torelli groups in stable range. As further applications, we, firstly, prove Morita's conjecture asserting that the Sp2g(Z)-invariant part of the rational cohomology of Ig stabilizes to the polynomial ring Q[e2,e4,…] in the even Miller-Morita-Mumford classes; secondly, we prove the uniform representation stability for the series of groups \ Hk(Ig1;Q)\g=1∞.