Optimally Sparse Multidimensional Representation Using Shearlets

In this paper we show that shearlets, an affine-like system of functions recently introduced by the authors and their collaborators, are essentially optimal in representing 2-dimensional functions f which are $C^2$ except for discontinuities along $C^2$ curves. More specifically, if $f_N^S$ is the N-term reconstruction of f obtained by using the N largest coefficients in the shearlet representation, then the asymptotic approximation error decays as $\norm{f-f_N^S}_2^2 \asymp N^{-2} (\log N)^3, N \to \infty,$ which is essentially optimal, and greatly outperforms the corresponding asymptotic approximation rate $N^{-1}$ associated with wavelet approximations. Unlike curvelets, which have similar sparsity properties, shearlets form an affine-like system and have a simpler mathematical structure. In fact, the elements of this system form a Parseval frame and are generated by applying dilations, shear transformations, and translations to a single well-localized window function.

[1]  Wang-Q Lim,et al.  The Theory of Wavelets with Composite Dilations , 2006 .

[2]  Ingrid Daubechies,et al.  Ten Lectures on Wavelets , 1992 .

[3]  E. Candès,et al.  New tight frames of curvelets and optimal representations of objects with piecewise C2 singularities , 2004 .

[4]  E. Candès,et al.  Curvelets: A Surprisingly Effective Nonadaptive Representation for Objects with Edges , 2000 .

[5]  Martin Vetterli,et al.  Data Compression and Harmonic Analysis , 1998, IEEE Trans. Inf. Theory.

[6]  Stéphane Mallat,et al.  Sparse geometric image representations with bandelets , 2005, IEEE Transactions on Image Processing.

[7]  Gitta Kutyniok,et al.  The Uncertainty Principle Associated with the Continuous Shearlet Transform , 2008, Int. J. Wavelets Multiresolution Inf. Process..

[8]  D. Labate,et al.  Sparse Multidimensional Representations using Anisotropic Dilation and Shear Operators , 2006 .

[9]  L. Hörmander,et al.  The Analysis of Linear Partial Differential Operators I: Distribution Theory and Fourier Analysis , 1983 .

[10]  E. Stein,et al.  Introduction to Fourier Analysis on Euclidean Spaces. , 1971 .

[11]  Wang-Q Lim,et al.  Wavelets with composite dilations and their MRA properties , 2006 .

[12]  N. Kingsbury Complex Wavelets for Shift Invariant Analysis and Filtering of Signals , 2001 .

[13]  E. Candès,et al.  Ridgelets: a key to higher-dimensional intermittency? , 1999, Philosophical Transactions of the Royal Society of London. Series A: Mathematical, Physical and Engineering Sciences.

[14]  S. Mallat A wavelet tour of signal processing , 1998 .

[15]  Wang-Q Lim,et al.  Sparse multidimensional representation using shearlets , 2005, SPIE Optics + Photonics.

[16]  Pierre Vandergheynst,et al.  Directional Wavelets Revisited: Cauchy Wavelets and Symmetry Detection in Patterns , 1999 .

[17]  G. Weiss,et al.  A First Course on Wavelets , 1996 .

[18]  R. DeVore,et al.  Nonlinear approximation , 1998, Acta Numerica.

[19]  Yue Lu A Directional Extension for Multidimensional Wavelet Transforms , 2005 .

[20]  Minh N. Do,et al.  Ieee Transactions on Image Processing the Contourlet Transform: an Efficient Directional Multiresolution Image Representation , 2022 .

[21]  L. Hörmander The analysis of linear partial differential operators , 1990 .

[22]  Wang-Q Lim,et al.  Wavelets with composite dilations , 2004 .

[23]  Mark J. T. Smith,et al.  A filter bank for the directional decomposition of images: theory and design , 1992, IEEE Trans. Signal Process..

[24]  D. D.-Y. Po,et al.  Directional multiscale modeling of images using the contourlet transform , 2006, IEEE Transactions on Image Processing.

[25]  D. Donoho Sparse Components of Images and Optimal Atomic Decompositions , 2001 .

[26]  Minh N. Do,et al.  Multidimensional Directional Filter Banks and Surfacelets , 2007, IEEE Transactions on Image Processing.

[27]  G. Easley,et al.  Sparse directional image representations using the discrete shearlet transform , 2008 .

[28]  C. Brislawn Fingerprints Go Digital , 1997 .

[29]  Ronald R. Coifman,et al.  Brushlets: A Tool for Directional Image Analysis and Image Compression , 1997 .