Abstract
A constructive algorithm based on the theory of spectral pairs for constructing nonuniform wavelet basis in \(L^{2}(\mathbb R)\) was considered by Gabardo and Nashed (J Funct. Anal. 158:209-241, 1998). In this setting, the associated translation set \({\Lambda } =\left \{ 0,r/N\right \}+2 \mathbb Z\) is no longer a discrete subgroup of \(\mathbb R\) but a spectrum associated with a certain one-dimensional spectral pair and the associated dilation is an even positive integer related to the given spectral pair. The main objective of this paper is to develop oblique and unitary extension principles for the construction nonuniform wavelet frames over non-Archimedean Local fields of positive characteristic. An example and some potential applications are also presented.
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Ahmad, O., Sheikh, N.A., Ali, M.A.: Nonuniform nonhomogeneous dual wavelet frames in Sobolev spaces in \(L^{2}(\mathbb K)\). Afrika Math. https://doi.org/10.1007/s13370-020-00786-1 (2020)
Ahmad, O., Sheikh, N.A.: On Characterization of nonuniform tight wavelet frames on local fields. Anal. Theory Appl. 34, 135–146 (2018)
Ahmad, O., Shah, F.A., Sheikh, N.A.: Gabor frames on non-Archimedean fields. Int. J. Geometr. Methods Modern Phys. 15, 1850079, 17 (2018)
Albeverio, S., Evdokimov, S., Skopina, M.: P-adic nonorthogonal wavelet bases. Proc. Steklov Inst. Math. 265, 135–146 (2009)
Albeverio, S., Evdokimov, S., Skopina, M.: P-adic multiresolution analysis and wavelet frames. J. Fourier Anal. Appl. 16, 693–714 (2010)
Albeverio, S., Khrennikov, A., Shelkovich, V.: Theory of P-Adic Distributions: Linear and Nonlinear Models. Cambridge University Press (2010)
Albeverio, S., Cianci, R., Yu, A.: Khrennikov, p-Adic valued quantization. p-Adic Numbers Ultrametric Anal. Appl. 1, 91–104 (2009)
Benedetto, J.J., Benedetto, R.L.: A wavelet theory for local fields and related groups. J. Geom. Anal. 14, 423–456 (2004)
Christensen, O., Goh, S.S.: The unitary extension principle on locally compact abelian groups. Appl. Comput. Harmon. Anal., to appear. Available at https://doi.org/10.1016/j.acha.2017.07.004
Casazza, P.G., Kutyniok, G.: Finite Frames: Theory and Applications. Birkhäuser (2012)
Chui, C.K., Shi, X.: Inequalities of Littlewood-Paley type for frames and wavelets. SIAM J. Math. Anal. 24, 263–277 (1993)
Christensen, O.: An Introduction to Frames and Riesz Bases. Birkhäuser, Boston (2003)
Daubechies, I.: Ten lectures on wavelets, CBMS-NSF series in applied mathematics. SIAM, Philadelphia (1992)
Daubechies, I., Han, B., Ron, A., Shen, Z.: Framelets MRA-based constructions of wavelet frames. Appl. Comput. Harmon. Anal. 14(1), 1–46 (2003)
Daubechies, I., Grossmann, A., Meyer, Y.: Painless non-orthogonal expansions. J. Math. Phys. 27(5), 1271–1283 (1986)
Duffin, R.J., Shaeffer, A.C.: A class of nonharmonic Fourier series. Trans. Amer. Math. Soc. 72, 341–366 (1952)
Evdokimov, S., Skopina, M.: 2-Adic wavelet bases. Proc. Steklov Inst. Math. 266, S143–S154 (2009)
Farkov, Y.: Orthogonal wavelets on locally compact abelian groups. Funct. Anal. Appl. 31, 294–296 (1997)
Farkov, Y.: Multiresolution Analysis and Wavelets on Vilenkin Groups, Facta Universitatis (NIS). Ser. Elec. Energ. 21, 309–325 (2008)
Gabardo, J.P., Nashed, M.: Nonuniform multiresolution analyses and spectral pairs. J. Funct. Anal. 158, 209–241 (1998)
Gabardo, J.P., Yu, X.: Wavelets associated with nonuniform multiresolution analyses and one-dimensional spectral pairs. J. Math. Anal. Appl. 323, 798–817 (2006)
Jiang, H.K., Li, D.F., Jin, N.: Multiresolution analysis on local fields. J. Math. Anal. Appl. 294, 523–532 (2004)
Khrennikov, A., Shelkovich, V.: Non-Haar p-adic wavelets and their application to pseudo-differential operators and equations. Appl. Comput. Harmon. Anal. 28, 1–23 (2010)
Khrennikov, A., Shelkovich, V., Skopina, M.: P-adic refinable functions and MRA-based wavelets. J. Approx. Theory. 161, 226–238 (2009)
Khrennikov, A., Oleschko, K., López, M.J.C.: Application of p-adic wavelets to model reaction-diffusion dynamics in random porous media. J. Fourier Anal. Appl. 22, 809–822 (2016)
Khrennikov, A.: Modeling of Processes of Thinking in P-Adic Coordinates [In Russian]. Fizmatlit, Moscow (2004)
Kozyrev, S., Khrennikov, A.: P-adic integral operators in wavelet bases. Doklady Math. 83, 209–212 (2011)
Kozyrev, S., Khrennikov, A., Shelkovich, V.: P-adic wavelets and their applications. Proc. Steklov Inst. Math. 285, 157–196 (2014)
Kozyrev, S.V.: Ultrametric Analysis and Interbasin Kinetics. In: Khrennikov, A.Y., Rakic, Z., Volovich, I.V. (eds.) P-Adic Mathematical Physics (AIP Conf. Proc., vol. 826, pp. 121–128. AIP, Melville (2006)
Lang, W.C.: Orthogonal wavelets on the Cantor dyadic group. SIAM J. Math. Anal. 27, 305–312 (1996)
Lang, W.C.: Wavelet analysis on the Cantor dyadic group. Houston J. Math. 24, 533–544 (1998)
Lang, W.C.: Fractal multiwavelets related to the cantor dyadic group. Int. J. Math. Math. Sci. 21, 307–314 (1998)
Li, D.F., Jiang, H.K.: The necessary condition and sufficient conditions for wavelet frame on local fields. J. Math. Anal. Appl. 345, 500–510 (2008)
Mallat, S.G.: Multiresolution approximations and wavelet orthonormal bases of \(L^{2},(\mathbb R)\). Trans. Amer. Math Soc. 315, 69–87 (1989)
Oleschko, K., Khrennikov, A.Y.: Applications of p-adics to geophysics: Linear and quasilinear diffusion of water-in-oil and oil-in-water emulsions. Theor. Math Phys. 190, 154–163 (2017)
Pourhadi, E., Khrennikov, A., Saadati, R., Oleschko, K., Correa Lopez, M.J.: Solvability of the p-Adic Analogue of Navier–Stokes Equation via the Wavelet Theory. Entropy 21, 1129 (2019)
Ron, A., Shen, Z.: Affine systems in \(L^{2}(\mathbb {R}^{d})\): the analysis of the analysis operator, J. Funct. Anal. 148, 408–447 (1997)
Shah, F.A., Ahmad, O.: Wave packet systems on local fields. J. Geom. Phys. 120, 5–18 (2017)
Shah, F.A., Ahmad, O., Rahimi, A.: Frames associated with shift invariant spaces on local fields. Filomat 32(9), 3097–3110 (2018)
Shah, F.A., Abdullah: Nonuniform multiresolution analysis on local fields of positive characteristic. Complex Anal. Opert Theory 9, 1589–1608 (2015)
Taibleson, M.H.: Fourier Analysis on Local Fields. Princeton University Press, Princeton (1975)
Vladimirov, V.S., Volovich, I.V., Zelenov, E.I.: P-Adic Analysis and Mathematical Physics (Series Sov. East Eur Math.), vol. 1. World Scientific, Singapore (1994)
Volovich, I.V.: P-adic string. Class. Q. Grav. 4, L83–L87 (1987)
Volovich, I.V.: p-adic space–time and string theory. Theor. Math. Phys. 71, 574–576 (1987)
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Ahmad, O., Ahmad, N. Construction of Nonuniform Wavelet Frames on Non-Archimedean Fields. Math Phys Anal Geom 23, 47 (2020). https://doi.org/10.1007/s11040-020-09371-1
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DOI: https://doi.org/10.1007/s11040-020-09371-1