Torsion at the Threshold for Mapping Class Groups
Abstract
The mapping class group g 1 of a closed orientable surface of genus g ≥ 1 with one marked point can be identified, by the Nielsen action, with a subgroup of the group of orientation preserving homeomorphims of the circle. This inclusion pulls back the powers of the discrete universal Euler class producing classes En ∈ H2n(g1;Z) for all n≥ 1. In this paper we study the power n=g, and prove: Eg is a torsion class which generates a cyclic subgroup of H2g(g1;Z) whose order is a positive integer multiple of 4g(2g+1)(2g-1).
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