Equivariant constructions of spheres with Zoll families of minimal spheres

Abstract

We construct one-parameter deformations of the Euclidean sphere Sn inside Rn+1 that admit a Zoll family of codimension one embedded minimal spheres, in all dimensions n≥ 3. The method of construction is equivariant with respect to the natural actions of the orthogonal group. In particular, we show that the original Zoll spheres of revolution in R3 have counterparts in the context of minimal surface theory, in all dimensions. We also describe the first examples of metrics on the real projective spaces RPn, in all dimensions n ≥ 3, that admit a Zoll family of embedded minimal projective hyperplanes, and which are not isometric to metrics with minimal linear projective hyperplanes. The new constructions are underpinned by equivariant versions of Nash-Moser-Hamilton implicit function theorem, and yield new information even in dimension n=2. As an application, we also show that every finite group of the orthogonal group O(3) that does not contain -Id is the isometry group of some (classical) Zoll metric on S2.