Toeplitz operators associated with the Whittaker Gabor transform and applications
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Hatem Mejjaoli
Abstract
The Whittaker Gabor transform (WGT) is a novel addition to the class of Gabor transforms, which has gained a respectable status in the realm of time-frequency signal analysis within a short span of time. Knowing the fact that the study of the time-frequency analysis is both theoretically interesting and practically useful, the aim of this article is to explore two more aspects of the time-frequency analysis associated with the WGT including the spectral analysis associated with the concentration operators and the scalogram.
Acknowledgements
The author is deeply indebted to the referees for providing constructive comments. The author thanks professors Saburou Saitoh and Man Wah Wong for their helps.
References
[1] L. D. Abreu, K. Gröchenig and J. L. Romero, On accumulated spectrograms, Trans. Amer. Math. Soc. 368 (2016), no. 5, 3629–3649. 10.1090/tran/6517Search in Google Scholar
[2] F. Al-Musallam, A Whittaker transform over a half-line, Integral Transform. Spec. Funct. 12 (2001), no. 3, 201–212. 10.1080/10652460108819345Search in Google Scholar
[3] F. Al-Musallam and V. K. Tuan, A finite and an infinite Whittaker integral transform, Comput. Math. Appl. 46 (2003), no. 12, 1847–1859. 10.1016/S0898-1221(03)90241-0Search in Google Scholar
[4] P. Balazs, Hilbert–Schmidt operators and frames-classification, best approximation by multipliers and algorithms, Int. J. Wavelets Multiresolut. Inf. Process. 6 (2008), no. 2, 315–330. 10.1142/S0219691308002379Search in Google Scholar
[5] P. A. Becker, On the integration of products of Whittaker functions with respect to the second index, J. Math. Phys. 45 (2004), no. 2, 761–773. 10.1063/1.1634351Search in Google Scholar
[6]
P. Boggiatto and M. W. Wong,
Two-wavelet localization operators on
[7] P. Brémaud, Mathematical Principles of Signal Processing, Springer, New York, 2002. 10.1007/978-1-4757-3669-4Search in Google Scholar
[8] E. Cordero and K. Gröchenig, Time-frequency analysis of localization operators, J. Funct. Anal. 205 (2003), no. 1, 107–131. 10.1016/S0022-1236(03)00166-6Search in Google Scholar
[9] W. Czaja and G. Gigante, Continuous Gabor transform for strong hypergroups, J. Fourier Anal. Appl. 9 (2003), no. 4, 321–339. 10.1007/s00041-003-0017-xSearch in Google Scholar
[10] I. Daubechies, Time-frequency localization operators: a geometric phase space approach, IEEE Trans. Inform. Theory 34 (1988), no. 4, 605–612. 10.1109/18.9761Search in Google Scholar
[11] F. De Mari, H. G. Feichtinger and K. Nowak, Uniform eigenvalue estimates for time-frequency localization operators, J. Lond. Math. Soc. (2) 65 (2002), no. 3, 720–732. 10.1112/S0024610702003101Search in Google Scholar
[12] L. Debnath and D. Bhatta, Integral Transforms and Their Applications, 3rd ed., CRC Press, Boca Raton, 2015. 10.1201/b17670Search in Google Scholar
[13] A. Erdélyi, W. Magnus, F. Oberhettinger and F. Tricomi, Transcendental Functions. Vol. 1, McGraw-Hill, New York, 1953. Search in Google Scholar
[14] H. G. Feichtinger, W. Kozek and F. Luef, Gabor analysis over finite abelian groups, Appl. Comput. Harmon. Anal. 26 (2009), no. 2, 230–248. 10.1016/j.acha.2008.04.006Search in Google Scholar
[15] H. G. Feichtinger and T. Strohmer, Advances in Gabor Analysis, Appl. Numer. Harmon. Anal., Birkhäuser, Boston, 2003. 10.1007/978-1-4612-0133-5Search in Google Scholar
[16] A. Ghaani Farashahi, Continuous partial Gabor transform for semi-direct product of locally compact groups, Bull. Malays. Math. Sci. Soc. 38 (2015), no. 2, 779–803. 10.1007/s40840-014-0049-1Search in Google Scholar
[17] A. Ghaani Farashahi and R. Kamyabi-Gol, Continuous Gabor transform for a class of non-abelian groups, Bull. Belg. Math. Soc. Simon Stevin 19 (2012), no. 4, 683–701. 10.36045/bbms/1353695909Search in Google Scholar
[18] S. Ghobber, S. Hkimi and S. Omri, Spectrograms and time-frequency localized functions in the Hankel setting, Oper. Matrices 13 (2019), no. 2, 507–525. 10.7153/oam-2019-13-39Search in Google Scholar
[19] S. Ghobber and S. Omri, Time-frequency concentration of the windowed Hankel transform, Integral Transforms Spec. Funct. 25 (2014), no. 6, 481–496. 10.1080/10652469.2013.877009Search in Google Scholar
[20] K. Gröchenig, Aspects of Gabor analysis on locally compact abelian groups, Gabor Analysis and Algorithms, Appl. Numer. Harmon. Anal., Birkhäuser, Boston (1998), 211–231. 10.1007/978-1-4612-2016-9_7Search in Google Scholar
[21] K. Gröchenig, Foundation of Time–Frequency Analysis, Birkhäuser, Boston, 2001. 10.1007/978-1-4612-0003-1Search in Google Scholar
[22] Z. He and M. W. Wong, Localization operators associated to square integrable group representations, PanAmer. Math. J. 6 (1996), no. 1, 93–104. Search in Google Scholar
[23] L. Liu, A trace class operator inequality, J. Math. Anal. Appl. 328 (2007), no. 2, 1484–1486. 10.1016/j.jmaa.2006.04.092Search in Google Scholar
[24]
B. Ma and M. W. Wong,
[25] J. Maan and A. Prasad, Abelian theorems in the framework of the distributional index Whittaker transform, Math. Commun. 27 (2022), no. 1, 1–9. Search in Google Scholar
[26] J. Maan and A. Prasad, Index Whittaker transform for Boehmians, Indian J. Pure Appl. Math. 55 (2024), no. 2, 489–500. 10.1007/s13226-023-00381-7Search in Google Scholar
[27]
H. Mejjaoli,
Practical inversion formulas for the Dunkl–Gabor transform on
[28]
H. Mejjaoli,
k-Hankel Gabor transform on
[29]
H. Mejjaoli,
Time-frequency analysis associated with the k-Hankel Gabor transform on
[30] H. Mejjaoli, Time-frequency analysis associated for the index Whittaker transform and applications, to appear. Search in Google Scholar
[31] H. Mejjaoli, Uncertainty principles for the Whittaker Wigner transform, to appear. Search in Google Scholar
[32] H. Mejjaoli and N. Sraieb, Uncertainty principles for the continuous Dunkl Gabor transform and the Dunkl continuous wavelet transform, Mediterr. J. Math. 5 (2008), no. 4, 443–466. 10.1007/s00009-008-0161-2Search in Google Scholar
[33] H. Mejjaoli and N. Sraieb, Gabor transform in quantum calculus and applications, Fract. Calc. Appl. Anal. 12 (2009), no. 3, 319–336. Search in Google Scholar
[34] A. Prasad, J. Maan and S. K. Verma, Wavelet transforms associated with the index Whittaker transform, Math. Methods Appl. Sci. 44 (2021), no. 13, 10734–10752. 10.1002/mma.7440Search in Google Scholar
[35] F. Riesz and B. Nagy, Functional Analysis, Frederick Ungar, New York, 1995. Search in Google Scholar
[36] F. A. Shah and A. Y. Tantary, Wavelet Transforms—Kith and Kin, Textb. Math., CRC Press, Boca Raton, 2022. 10.1201/9781003175766Search in Google Scholar
[37] F. Soltani, Reconstruction and best approximate inversion formulas for the modified Whittaker–Stockwell transform, Ramanujan J. 65 (2024), no. 1, 313–331. 10.1007/s11139-024-00900-ySearch in Google Scholar
[38] R. Sousa, M. Guerra and S. Yakubovich, On the product formula and convolution associated with the index Whittaker transform, J. Math. Anal. Appl. 475 (2019), no. 1, 939–965. 10.1016/j.jmaa.2019.03.009Search in Google Scholar
[39] R. Sousa, M. Guerra and S. Yakubovich, Lévy processes with respect to the Whittaker convolution, Trans. Amer. Math. Soc. 374 (2021), no. 4, 2383–2419. 10.1090/tran/8294Search in Google Scholar
[40] H. M. Srivastava, Y. V. Vasil’ev and S. B. Yakubovich, A class of index transforms with Whittaker’s function as the kernel, Quart. J. Math. Oxford Ser. (2) 49 (1998), no. 195, 375–394. 10.1093/qjmath/49.195.375Search in Google Scholar
[41] E. M. Stein, Interpolation of linear operators, Trans. Amer. Math. Soc. 83 (1956), 482–492. 10.1090/S0002-9947-1956-0082586-0Search in Google Scholar
[42] K. Trimèche, Generalized wavelets and hypergroups, Gordon and Breach Science, Amsterdam, 1997. Search in Google Scholar
[43] B. van der Pol, The fundamental principles of frequency modulation, J. Inst. Elec. Engrs. Part III 93 (1946), 153–158. 10.1049/ji-3-2.1946.0024Search in Google Scholar
[44] E. Wilczok, New uncertainty principles for the continuous Gabor transform and the continuous wavelet transform, Doc. Math. 5 (2000), 201–226. 10.4171/dm/79Search in Google Scholar
[45] M. W. Wong, Localization operators on the Weyl–Heisenberg group, Geometry, Analysis and Applications, World-Scientific, Hackensack (2001), 303–314. Search in Google Scholar
[46]
M. W. Wong,
[47] M. W. Wong, Wavelet Transforms and Localization Operators, Oper. Theory Adv. Appl. 136, Birkhäuser, Basel, 2002. 10.1007/978-3-0348-8217-0Search in Google Scholar
[48] M. W. Wong, Localization operators on the affine group and paracommutators, Progress in Analysis, World Scientific, Hackensack (2003), 663–669. 10.1142/9789812794253_0075Search in Google Scholar
[49] S. B. Yakubovich, Index Transforms, World Scientific, River Edge, 1996. 10.1142/9789812831064Search in Google Scholar
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