A note on constructing affine systems for L2
暂无分享,去创建一个
[1] Sur la convergence forte dans les champs $L^{p}$ , 1930 .
[2] R. DeVore,et al. On the construction of multivariate (pre)wavelets , 1993 .
[3] I. Daubechies. Ten Lectures on Wavelets , 1992 .
[4] R. DeVore,et al. Approximation from shift-invariant subspaces of ₂(^{}) , 1994 .
[5] A. Ron,et al. Frames and Stable Bases for Shift-Invariant Subspaces of L2(ℝd) , 1995, Canadian Journal of Mathematics.
[6] V. I. Filippov,et al. Representation in Lp by Series of Translates and Dilates of One Function , 1995 .
[7] Ding-Xuan Zhou,et al. Order of linear approximation from shift-invariant spaces , 1995 .
[8] On the Completeness and Other Properties of Some Function Systems inLp, 0 , 1998 .
[9] S. Mallat. A wavelet tour of signal processing , 1998 .
[10] M. Unser. Sampling-50 years after Shannon , 2000, Proceedings of the IEEE.
[11] O. Christensen. An introduction to frames and Riesz bases , 2002 .
[12] Olga Holtz,et al. Approximation orders of shift-invariant subspaces of Ws2(Rd) , 2005, J. Approx. Theory.
[13] R. Laugesen,et al. Affine Systems that Span Lebesgue Spaces , 2005 .
[14] On Translation and Affine Systems Spanning L1(ℝ) , 2006 .
[15] Hans G. Feichtinger,et al. Quasi-interpolation in the Fourier algebra , 2007, J. Approx. Theory.
[16] R. Laugesen,et al. Affine Synthesis onto Lebesgue and Hardy Spaces , 2008 .
[17] R. Laugesen. Affine Synthesis onto Lp when 0 , 2007, math/0703313.