Global uniqueness of the minimal sphere in the Atiyah-Hitchin manifold

Abstract

In this note, we study submanifold geometry of the Atiyah-Hitchin manifold, the double cover of the 2-monopole moduli space. When the manifold is naturally identified as the total space of a line bundle over S2, the zero section is a distinguished minimal 2-sphere of considerable interest. In particular, there has been a conjecture by Micallef and Wolfson [Math. Ann. 295 (1993), Remark on p.262] about the uniqueness of this minimal 2-sphere among all closed minimal 2-surfaces. We show that this minimal 2-sphere satisfies the "strong stability condition" proposed in our earlier work [arXiv:1710.00433], and confirm the global uniqueness as a corollary.