Multiresolution Analysis and Haar Wavelets on the Product of Heisenberg Group
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[1] Lizhong Peng,et al. Admissible wavelets associated with the Heisenberg group , 1997 .
[2] G. Ólafsson,et al. Continuous Action of Lie Groups on ℝn and Frames , 2005, Int. J. Wavelets Multiresolution Inf. Process..
[3] Karlheinz Gröchenig,et al. Multiresolution analysis, Haar bases, and self-similar tilings of Rn , 1992, IEEE Trans. Inf. Theory.
[4] Jianxun He,et al. An Inversion Formula of the Radon Transform on the Heisenberg Group , 2004, Canadian Mathematical Bulletin.
[5] Daryl Geller,et al. Fourier analysis on the Heisenberg group. I. Schwartz space , 1980 .
[6] Nobuatsu Tanaka. A Simple but Efficient Preconditioning for Conjugate Gradient Poisson Solver Using Haar Wavelet , 2006, Int. J. Wavelets Multiresolution Inf. Process..
[7] Robert S. Strichartz,et al. Wavelets and self-affine tilings , 1993 .
[8] Wayne Lawton,et al. Infinite convolution products and refinable distributions on Lie groups , 2000 .
[9] Jianxun He,et al. CONTINUOUS MULTISCALE ANALYSIS ON THE HEISENBERG GROUP , 2001 .
[10] Jianxun He,et al. Admissible Wavelets Associated with the Affine Automorphism Group of the Siegel Upper Half-Plane , 1997 .
[11] S. Mallat. Multiresolution approximations and wavelet orthonormal bases of L^2(R) , 1989 .