Existence and classification of S1-invariant free boundary annuli and M\"obius bands in Bn

Abstract

We explicitly classify all S1-invariant free boundary minimal annuli and M\"obius bands in Bn. This classification is obtained from an analysis of the spectrum of the Dirichlet-to-Neumann map for S1-invariant metrics on the annulus and M\"obius band. First, we determine the supremum of the k-th normalized Steklov eigenvalue among all S1-invariant metrics on the M\"obius band for each k ≥ 1, and show that it is achieved by the induced metric from a free boundary minimal embedding of the M\"obius band into B4 by k-th Steklov eigenfunctions. We then show that the critical metrics of the normalized Steklov eigenvalues on the space of S1-invariant metrics on the annulus and M\"obius band are the induced metrics on explicit free boundary minimal annuli and M\"obius bands in B3 and B4, including some new families of free boundary minimal annuli and M\"obius bands in B4. Finally, we prove that these are the only S1-invariant free boundary minimal annuli and M\"obius bands in Bn.