Reducing spheres of genus-2 Heegaard splitting of S3
Abstract
The Goeritz group of the standard genus-g Heegaard splitting of the three sphere, Gg, acts on the space of isotopy classes of reducing spheres for this Heegaard splitting. Scharlemann MR2199366 (2007c:57020) uses this action to prove that G2 is finitely generated. In this article, we give an algorithm to construct any reducing sphere from a standard reducing sphere for a genus-2 Heegaard splitting of the S3. Using this we give an alternate proof of the finite generation of G2 assuming the finite generation of the stabilizer of the standard reducing sphere.
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