Complex Analysis and Operator Theory

, Volume 13, Issue 3, pp 753–780 | Cite as

Boundedness and Compactness of Localization Operators Associated with the Spherical Mean Wigner Transform

  • Hatem MejjaoliEmail author
  • Khalifa Trimèche


We introduce the notion of localization operators associated with the spherical mean Wigner transform, and we give a trace formula for the localization operators associated with the spherical mean Wigner transform as a bounded linear operator in the trace class from \(L^{2}(d\nu )\) into \(L^{2}(d\nu )\) in terms of the symbol and the two admissible wavelets. Next, we give results on the boundedness and compactness of localization operators associated with the spherical mean Wigner transform on \(L^{p}(d\nu )\), \(1 \le p \le \infty \).


Spherical mean operator Spherical mean Wigner transform Localisation operators 

Mathematics Subject Classification

33E30 42B10 43A32 44A20 



The authors are deeply indebted to the referees for providing constructive comments and helps in improving the contents of this article. The first author thanks the professor M.W. Wong for his help.


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Authors and Affiliations

  1. 1.Department of Mathematics, College of SciencesTaibah UniversityAl-Madinah AL-MunawarahSaudi Arabia
  2. 2.Department of Mathematics, Faculty of Sciences of TunisUniversity of Tunis El ManarTunisTunisia

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