A proof of Powell's conjecture on the Goeritz group of S3

Abstract

For a genus g Heegaard splitting of the 3-sphere, the Goeritz group is defined to be the group of isotopy classes of diffeomorphisms of the 3-sphere that preserve the splitting setwise. In this paper, we prove the following conjecture proposed by Powell: For every g 3, the Goeritz group of a genus g Heegaard splitting is generated by four specific elements. Our proof relies crucially on the fact that a Heegaard surface of the 3-sphere is topologically minimal, that is, its disk complex has nontrivial homotopy group in some dimension. Along the way, we also give a new proof of the fact that a genus g Heegaard surface of the 3-sphere has topological index 2g-1.