Extending automorphisms of the genus-2 surface over the 3-sphere

Abstract

An automorphism f of a closed orientable surface is said to be extendable over the 3-sphere S3 if f extends to an automorphism of the pair (S3, ) with respect to some embedding S3. We prove that if an automorphism of a genus-2 surface is extendable over S3, then f extends to an automorphism of the pair (S3, ) with respect to an embedding S3 such that bounds genus-2 handlebodies on both sides. The classification of essential annuli in the exterior of genus-2 handlebodies embedded in S3 due to Ozawa and the second author plays a key role.