Spectral properties of symmetrized AMV operators

Manuel Dias; David Tewodrose

Spectral properties of symmetrized AMV operators

Research output: Working paper › Preprint

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Abstract

The symmetrized Asymptotic Mean Value Laplacian $\tilde{\Delta}$, obtained as limit of approximating operators $\tilde{\Delta}_r$, is an extension of the classical Euclidean Laplace operator to the realm of metric measure spaces. We show that, as $r \downarrow 0$, the operators $\tilde{\Delta}_r$ eventually admit isolated eigenvalues defined via min-max procedure on any compact locally Ahlfors regular metric measure space. Then we prove $L^2$ and spectral convergence of $\tilde{\Delta}_r$ to the Laplace--Beltrami operator of a compact Riemannian manifold, imposing Neumann conditions when the manifold has a non-empty boundary.

Original language	English
Publication status	Published - 15 Nov 2024

Bibliographical note

35 pages, all comments welcome

Access to Document

2411.10202v1Submitted manuscript, 393 KB
2411.10202v1

Cite this

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