Powell's Conjecture on the Goeritz group of S3 is stably true
Abstract
In 1980 J. Powell proposed that, for every genus g, five specific elements suffice to generate the Goeritz group Gg of genus g Heegaard splittings of S3. Powell's Conjecture remains undecided for g ≥ 4. Let Pg ⊂ Gg denote the subgroup generated by Powell's elements. Here we show that, for each genus g, the natural function Gg Gg+1/ Pg+1 is trivial.
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