Rachel Greenfeld, Nir Lev
Published 2016-02-29Version 1
A bounded set $\Omega \subset \mathbb{R}^d$ is called a spectral set if the space $L^2(\Omega)$ admits a complete orthogonal system of exponential functions. We prove that a cylindric set $\Omega$ is spectral if and only if its base is a spectral set. A similar characterization is obtained of the cylindric sets which can tile the space by translations.
Spectrality of the product does not imply that the components are spectral
Spectral sets in $\Z_{p^2qr}$ tile
Spectrality of generalized Sierpinski-type self-affine measures
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