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Recent Progress in Shearlet Theory: Systematic Construction of Shearlet Dilation Groups, Characterization of Wavefront Sets, and New Embeddings

by G. S. Alberti and S. Dahlke and F. De Mari and E. De Vito and H. Führ

(Report number 2016-27)

Abstract
The class of generalized shearlet dilation groups has recently been developed to allow the unified treatment of various shearlet groups and associated shearlet transforms that had previously been studied on a case-by-case basis. We consider several aspects of these groups: First, their systematic construction from associative algebras, secondly, their suitability for the characterization of wavefront sets, and finally, the question of constructing embeddings into the symplectic group in a way that intertwines the quasi-regular representation with the metaplectic one. For all questions, it is possible to treat the full class of generalized shearlet groups in a comprehensive and unified way, thus generalizing known results to an infinity of new cases. Our presentation emphasizes the interplay between the algebraic structure underlying the construction of the shearlet dilation groups, the geometric properties of the dual action, and the analytic properties of the associated shearlet transforms.

Keywords: Wavefront set, microlocal analysis, generalized shearlet groups, quasi-regular representation, metaplectic representation.

BibTeX

@Techreport{ADDDF16_664,
  author = {G. S. Alberti and S. Dahlke and F. De Mari and E. De Vito and H. F\"uhr},
  title = {Recent Progress in Shearlet Theory: Systematic Construction of Shearlet Dilation Groups, Characterization of Wavefront Sets, and New Embeddings},
  institution = {Seminar for Applied Mathematics, ETH Z{\"u}rich},
  number = {2016-27},
  address = {Switzerland},
  url = {https://www.sam.math.ethz.ch/sam_reports/reports_final/reports2016/2016-27.pdf },
  year = {2016}
}

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First published: May 2016 (PDF)file_download

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