Spectral properties of symmetrized AMV operators

Abstract

The symmetrized Asymptotic Mean Value Laplacian , obtained as limit of approximating operators r, is an extension of the classical Euclidean Laplace operator to the realm of metric measure spaces. We show that, as r 0, the operators r eventually admit isolated eigenvalues defined via min-max procedure on any compact locally Ahlfors regular metric measure space. Then we prove L2 and spectral convergence of r to the Laplace--Beltrami operator of a compact Riemannian manifold, imposing Neumann conditions when the manifold has a non-empty boundary.

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