Spectral measure of Laplacean operators in Paley-Wiener space

Dang Vu Giang

arXiv:1005.1438·math.GM·April 3, 2013

Spectral measure of Laplacean operators in Paley-Wiener space

Dang Vu Giang

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Abstract

We are interested in computing the spectral measure of Laplacean operators in Paley-Wiener space, the Hilbert space of all square integrable functions having Fourier transforms supported in a compact set $K$ , the closure of an open bounded set in $R^{N}$ . I is well-known that every differential operator is bounded in this space. Among others, we will prove that the spectrum of Laplace operator is the set ${- ∣ x ∣^{2} : x \in K} .$

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TopicsMathematical Analysis and Transform Methods · Spectral Theory in Mathematical Physics · Numerical methods in inverse problems