Department of Mathematics and Statistics
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Browsing Department of Mathematics and Statistics by Subject "autocorrelation"
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Item Circular symmetry of pinwheel diffraction(2006) Strungaru, Nicolae; Moody, R. V.; Postnikoff, D.A method is given for explicitly determining the autocorrelation of the pinwheel tiling by use of the substitution system generating the tiling. Using this a new proof of the circular symmetry of the diffraction of the pinwheel tiling is given.Item Diffraction theory and almost periodic distributions(2016) Strungaru, Nicolae; Terauds, VentaWe introduce and study the notions of translation bounded tempered distributions, and autocorrelation for a tempered distrubution. We further introduce the spaces of weakly, strongly and null weakly almost periodic tempered distributions and show that for weakly almost periodic tempered distributions the Eberlein decomposition holds. For translation bounded measures all these notions coincide with the classical ones. We show that tempered distributions with measure Fourier transform are weakly almost periodic and that for this class, the Eberlein decomposition is exactly the Fourier dual of the Lesbegue decomposition, with the Fourier-Bohr coefficients specifying the pure point part of the Fourier transform. We complete the project by looking at few interesting examples.Item Note on the set of Bragg peaks with high intensity(2016) Strungaru, Nicolae; Lenz, DanielWe consider diffraction of Delone sets in Euclidean space. We show that the set of Bragg peaks with high intensity is always Meyer (if it is relatively dense). We use this to provide a new characterization for Meyer sets in terms of positive and positive definite measures. Our results are based on a careful study of positive definite measures, which may be of interest in its own right.