https://orcid.org/0000-0003-1649-2364
References
- Coifman R, Meyer Y, Quake S, et al. Signal processing and compression with wave packets. In: Wavelets and their applications. Kluwer Academic Publisher; 1994. p. 363–378.
- Khanna NS, Kaushik K, Pap M. Periodized wavelet packets on bounded subsets of R. J Contemp Mathemat Anal. 2021;56:234–244. doi: 10.3103/S1068362321040130
- Khanna N, Kaushik SK, Jarrah AM. Wavelet packets: uniform approximation and numerical integration. Int J Wavelets Multiresolut Inf Process. 2020;18:2050004. doi: 10.1142/S0219691320500046
- Khanna N, Kaushik SK. Wavelet packet approximation theorem for Hr type norm. Integral Transforms Spec Funct. 2019;30:231–239. doi: 10.1080/10652469.2018.1555585
- Khanna N, Kumar V, Kaushik SK. Wavelet packets and their vanishing moments. Poincare J Anal Appl. 2017;2:95–105. doi: 10.46753/pjaa.2017.v04i02.005
- Khanna N, Kumar VKSK. Wavelet packet approximation. Integral Transforms Spec Funct. 2016;27:698–714. doi: 10.1080/10652469.2016.1189912
- Ahmad K, Kumar R, Debnath L. On Fourier transforms of wavelet packets. Z Anal Anwend. 2001;20(3):579–588. doi: 10.4171/zaa
- Huang Y, Suter B. Fractional wave packet transform. In: 1996 IEEE Digital Signal Processing Workshop Proceedings. 1996. p. 413–415.
- Antonini M, Barlaud M, Mathieu P, et al. Image coding using wavelet transform. IEEE Trans Image Process. 1992;1(2):205–220. doi: 10.1109/83.136597
- Akay M. Wavelets in biomedical engineering. Ann Biomed Eng. 1995;23(5):531–542. doi: 10.1007/BF02584453
- Chui CK. An introduction to wavelets. New York: Academic Press; 1992.
- Daubechies I. Ten lectures on wavelets. 1992. (CBMS-NSF regional Conf. Ser. Appl. Math.).
- Prasad A, Verma SK. Continuous wavelet transform associated with zero-order Mehler–Fock transform and its composition. Int J Wavelets Multiresolut Inf Process. 2018;16:1850050. doi: 10.1142/S0219691318500509
- Mehler FG. Ueber eine mit den kugel-und cylinderfunctionen verwandte function und ihre anwendung in der theorie elektricitatsvertheilung. Math Anal Bd. 1881;18:161–194. doi: 10.1007/BF01445847
- Fock VA. On the representation of an arbitrary function by integrals involving the Legendre function with a complex index. Dokl AN SSSR. 1943;39:279–283.
- Yakubovich SB, Luchko YF. The hypergeometric approach to integral transforms and convolutions. Dordrecht: Kluwer Academic Publishers; 1994.
- Trimèche K. Generalized harmonic analysis and wavelet packets: an elementary treatment of theory and applications. Florida: CRC Press; 2001.
- Tyr O, Dades A, Daher R. Wavelet packet analysis associated with the Weinstein operator on R+d+1. J Anal. 2022;31(1):31–56. doi: 10.1007/s41478-022-00441-x
- Tyr O, Daher R, Dades A, et al. Wavelet packet analysis in the framework of Heckman-Opdam theory on Rd. J Math Sci. 2022;266(2):308–324. doi: 10.1007/s10958-022-05887-9
- Coifman RR, Wickerhauser MV. Entropy-based algorithms for best basis selection. IEEE Trans Inf Theory. 1992;38:1241–1243. doi: 10.1109/18.119732
- Glaeske HN, Hess A. On the convolution theorem of the Mehler-Fock transform for a class of generalized functions (I). Math Nachr. 1987;131:107–117. doi: 10.1002/mana.v131:1
- Sneddon IN. The use of integral transforms. New York: McGray Hill; 1972.
- Yakubovich SB. Index transforms. Singapore: World Scientific Publishing Company; 1996.
- Prasad A, Verma SK, Mandal UK. The convolution for zero-order Mehler–Fock transform and pseudo-differential operator. Integral Transf Spec Funct. 2018;29(3):189–206. doi: 10.1080/10652469.2017.1420067
- Frazier M, Jawerth B, Weiss G. Littlewood-Paley theory and the study of function spaces. Rhode Island: American Mathematical Society; 1991.