Laplace-eigenfunctions on the torus with high vanishing order
Abstract
We use the sum-of-squares theorem from number theory to construct eigenfunctions of the Laplacian on the d-dimensional torus, d ≥ 2, which vanish to any prescribed order at some point. These functions are then applied to provide a negative answer (in dimension d ≥ 2) to a question in the context of quantitative unique continuation for spectral projectors of Schr\"odinger operators, asked by Egidi and Veseli\'c.
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