Large topology asymptotics for spectrally extremal minimal surfaces in B3 and S3
Abstract
In recent work with Kusner, we developed a method, based on the equivariant optimization of Laplace and Steklov eigenvalues, for producing minimal surfaces of prescribed topology in low-dimensional balls and spheres. We used the method to construct many new minimal embeddings in S3 with area below 8π, and many new free boundary minimal embeddings in B3 with area below 2π. In this paper, we study the geometry of these surfaces in more detail, with an emphasis on studying sharp area estimates and varifold limits in the large Euler characteristic regime. This allows us to confirm some well-known conjectures regarding the space of low-area minimal surfaces in S3 in this class of examples and the special role played by Lawson's γ,1 surfaces. We also confirm analogous statements in B3 and identify a family of free boundary minimal surfaces in B3 most closely resembling γ,1.
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