Extendability over the 4-sphere and invariant spin structures of surface automorphisms

Abstract

It is known that an automorphism of Fg, the oriented closed surface of genus g, is extendable over the 4-sphere S4 if and only if it has a bounding invariant spin structure WsWz. We show that each automorphism of Fg has an invariant spin structure, and obtain a stably extendable result: Each automorphism of Fg is extendable over S4 after a connected sum with the identity map on the torus. Then each automorphism of an oriented once punctured surface is extendable over S4. For each g≠ 4, we construct a periodic map on Fg that is not extendable over S4, and we prove that every periodic map on F4 is extendable over S4, which answer a question in WsWz. We illustrate for an automorphism f of Fg, how to find its invariant spin structures, bounding or not; and once f has a bounding invariant spin structure, how to construct an embedding Fg S4 so that f is extendable with respect to this embedding.

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