200 research outputs found
A note on the abelianizations of finite-index subgroups of the mapping class group
For some , let be a finite index subgroup of the mapping
class group of a genus surface (possibly with boundary components and
punctures). An old conjecture of Ivanov says that the abelianization of
should be finite. In this note, we prove two theorems supporting this
conjecture. For the first, let denote the Dehn twist about a simple
closed curve . For some , we have . We prove
that is torsion in the abelianization of . Our second result
shows that the abelianization of is finite if contains a
"large chunk" (in a certain technical sense) of the Johnson kernel, that is,
the subgroup of the mapping class group generated by twists about separating
curves. This generalizes work of Hain and Boggi.Comment: 6 pages, 1 figure; a few revisions; to appear in Proc. Amer. Math.
So
Partial Torelli groups and homological stability
We prove a homological stability theorem for the subgroup of the mapping
class group acting as the identity on some fixed portion of the first homology
group of the surface. We also prove a similar theorem for the subgroup of the
mapping class group preserving a fixed map from the fundamental group to a
finite group, which can be viewed as a mapping class group version of a theorem
of Ellenberg-Venkatesh-Westerland about braid groups. These results require
studying various simplicial complexes formed by subsurfaces of the surface,
generalizing work of Hatcher-Vogtmann.Comment: 58 pages, 59 figures; fixed some typo
Generating the Johnson filtration
For k >= 1, let Torelli_g^1(k) be the k-th term in the Johnson filtration of
the mapping class group of a genus g surface with one boundary component. We
prove that for all k, there exists some G_k >= 0 such that Torelli_g^1(k) is
generated by elements which are supported on subsurfaces whose genus is at most
G_k. We also prove similar theorems for the Johnson filtration of Aut(F_n) and
for certain mod-p analogues of the Johnson filtrations of both the mapping
class group and of Aut(F_n). The main tools used in the proofs are the related
theories of FI-modules (due to the first author together with Ellenberg and
Farb) and central stability (due to the second author), both of which concern
the representation theory of the symmetric groups over Z.Comment: 32 pages; v2: paper reorganized. Final version, to appear in Geometry
and Topolog
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