Email this article Reduced synthesis in harmonic analysis and compact synthesis in operator theory
- Authors: Shulman V.S.1, Todorov I.G.2, Turowska L.3,4
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Affiliations:
- Vologda State University
- Pure Mathematics Research Centre, Queen’s University Belfast
- Department of Mathematical Sciences, Chalmers University of Technology
- University of Gothenburg
- Issue: Vol 51, No 3 (2017)
- Pages: 240-243
- Section: Brief Communications
- URL: https://journal-vniispk.ru/0016-2663/article/view/234347
- DOI: https://doi.org/10.1007/s10688-017-0189-9
- ID: 234347
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Abstract
The notion of reduced synthesis in the context of harmonic analysis on general locally compact groups is introduced; in the classical situation of commutative groups, this notion means that a function f in the Fourier algebra is annihilated by any pseudofunction supported on f−1(0). A relationship between reduced synthesis and compact synthesis (i.e., the possibility of approximating compact operators by pseudointegral ones without increasing the support) is determined, which makes it possible to obtain new results both in operator theory and in harmonic analysis. Applications to the theory of linear operator equations are also given.
About the authors
V. S. Shulman
Vologda State University
Author for correspondence.
Email: shulman.victor80@gmail.com
Russian Federation, Vologda
I. G. Todorov
Pure Mathematics Research Centre, Queen’s University Belfast
Email: shulman.victor80@gmail.com
United Kingdom, Belfast
L. Turowska
Department of Mathematical Sciences, Chalmers University of Technology; University of Gothenburg
Email: shulman.victor80@gmail.com
Sweden, Gothenburg; Gothenburg
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