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Integral Transforms and Special Functions Volume 26, 2015 - Issue 9
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Original Articles

Heisenberg-type inequalities for the Weinstein operator

Néjib Ben SalemFaculté des Sciences de Tunis, Université de Tunis El Manar, LR11ES11 Analyse Mathématiques et Applications, 2092Tunis, TunisiaCorrespondence[email protected]
&
Amgad Rashed NasrFaculté des Sciences de Tunis, Université de Tunis El Manar, LR11ES11 Analyse Mathématiques et Applications, 2092Tunis, Tunisia
Pages 700-718 | Received 06 Jan 2015, Accepted 03 Apr 2015, Published online: 28 Apr 2015

References

  • Folland GB, Sitaram A. The uncertainty principle: A mathematical survey. J Fourier Anal Appl. 1997;3:207–238. doi: 10.1007/BF02649110
  • Bowie PC. Uncertainty inequalities for Hankel transforms. SIAM J Math Anal. 1971;2:601–606. doi: 10.1137/0502059
  • Rösler M, Voit M. An uncertainty principle for Hankel transform. Proc Amer Math Soc. 1999;127:183–195. doi: 10.1090/S0002-9939-99-04553-0
  • Ben Nahia Z, Ben Salem N. Spherical harmonics and applications associated with the Weinstein operator. In: Potential Theory – Proceedings of the ICPT 94; 1994. p. 223–241.
  • Ben Nahia Z, Ben Salem N. On a mean value property associated with the Weinstein operator. In: Potential Theory – Proceedings of the ICPT 94; 1994. p. 243–253.
  • Brelot M. Équation de Weinstein et potentiels de Marcel Riesz. In: Hirsch F, Mokobodzki G, editors. Séminaire de Théorie du Potentiel, No. 3 (Paris, 1976/1977). Lecture Notes in Mathematics, Vol. 681. Berlin: Springer; 1978. p. 18–38.
  • Weinstein A. Singular partial differential equations and their applications. Fluid dynamics and applied mathematics. New York: Gordon and Breach; 1962. p. 29–49.
  • Mejjaoli H, Salhi M. Uncertainty principles for the Weinstein transform. Czechoslovak Math J. 2011;61:941–974. doi: 10.1007/s10587-011-0061-7
  • Shapiro HS. Uncertainty principles for basis in L2(R). Unpublished manuscript.
  • Ghobber S. Phase space localization of orthonormal sequences in Lα2(R+). J Approx Theory. 2015;189:123–136. doi: 10.1016/j.jat.2014.10.008
  • Malinnikova E. Orthonormal sequences in L2(Rd) and time frequency localization. J Fourier Anal Appl. 2010;16:983–1006. doi: 10.1007/s00041-009-9114-9
  • Mejjaoli H, Salem AOA. Weinstein Gabor transform and applications. Adv Pure Math J. 2012;2:203–210. doi: 10.4236/apm.2012.23029
  • Ghobber S, Omri S. Time–frequency concentration of the windowed Hankel transform. Integr Transf Spec Funct. 2014;25:481–496. doi: 10.1080/10652469.2013.877009
  • de Bruijn NG. Uncertainty principles in Fourier analysis. In: Inequalities (Proc. Sympos. Wright-Patterson Air Force Base, OH, 1965). Academic Press: New York; 1967. p. 57–71.
  • Rassias JM. On the Heisenberg–Weyl uncertainty inequality. J Inequal Pure Appl Math. 2005;6 ( Article 11, 8 pp).
  • Ciatti P, Ricci F, Sundari M. Heisenberg–Pauli–Weyl uncertainty inequalities and polynomial volume growth. Adv Math. 2007;215:616–625. doi: 10.1016/j.aim.2007.03.014
  • Ghobber S, Jaming Ph. Uncertainty principles for integral operators. Studia Math. 2014;220:197–220. doi: 10.4064/sm220-3-1
  • Bonami A, Demange B, Jaming Ph. Hermite functions and uncertainty principles for the Fourier and the windowed Fourier transforms. Rev Mat Iberoam. 2003;19:23–55. doi: 10.4171/RMI/337

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