A generating set for the Johnson kernel
Abstract
For a connected orientable hyperbolic surface S without boundary and of finite topological type, the Johnson kernel K(S) is the subgroup of the mapping class group of S generated by Dehn twists about separating simple closed curves on S. We prove that K(S) is generated by the Dehn twists about separating simple closed curves on S bounding either: a closed subsurface of genus 1 or 2; a closed subsurface of genus 1 minus one point; a closed disc minus two points.
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