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In CFS, the author and collaborators construct infinitely many nonlocal s-minimal hypersurfaces (via min-max methods) on any closed n-dimensional Riemannian manifold M, obtaining an analogue of Yau's conjecture for s (0, 1). The present article proves a Weyl Law for the fractional perimeters of these hypersurfaces, and it shows their convergence as s 1 (for n=3) to smooth classical minimal surfaces. Our results are used in particular to give a novel proof of the density and equidistribution of classical minimal surfaces for generic metrics in three dimensions, showcasing nonlocal minimal surfaces also as a new approximation theory for the area functional.
Enric Florit-Simon (Mon,) studied this question.