Thomas Church
Published 2011-08-23, updated 2014-04-07Version 3
This paper has two main goals. First, we give a complete, explicit, and computable solution to the problem of when two simple closed curves on a surface are equivalent under the Johnson kernel. Second, we show that the Johnson filtration and the Johnson homomorphism can be defined intrinsically on subsurfaces and prove that both are functorial under inclusions of subsurfaces. The key point is that the latter reduces the former to a finite computation, which can be carried out by hand. In particular this solves the conjugacy problem in the Johnson kernel for separating twists. Using a theorem of Putman, we compute the first Betti number of the Torelli group of a subsurface.
Comments: 42 pages, 2 figures. v3: paper completely rewritten; final version, to appear in American Journal of Mathematics
Journal: American Journal of Mathematics 136 (2014), 943-994
The Johnson homomorphism and its kernel
Commensurations of the Johnson kernel
Addendum to: Commensurations of the Johnson kernel
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