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174 BIBLIOGRAPHY [37] E. M. Deloraine and A. H. Reeves. The 25th anniversary of pulse code modulation. IEEE Spectrum, pages 56–64, May 1965. [38] R. S. Dembo, S. C. Eisenstat, and T. Steihaug. Inexact Newton methods. SIAM J. Numer. Anal., 19(2):400–8, 1982. [39] R. S. Dembo and T. Steihaug. Truncated Newton algorithms for large-scale unconstrained optimization. Math. Programming, 26(2):190–212, 1983. [40] R.A. DeVore and V.N. Temlyakov. Some remarks on greedy algorithms. Advances in Computational Mathematics, 5(2-3):173–87, 1996. [41] Y. Dodge. Statistical Data Analysis: Based on the L 1 −norm and Related Methods. North-Holland, 1987. [42] D. L Donoho and etc. WaveLab. Stanford University, Stanford, CA, .701 edition. http://www-stat.stanford.edu/˜wavelab. [43] David Donoho and Xiaoming Huo. Uncertainty principles and ideal atomic decomposition. Working paper, June 1999. [44] David L. Donoho. Interpolating wavelet transforms. Technical report, Stanford University, 1992. [45] David L. Donoho. Smooth wavelet decompositions with blocky coefficient kernels. Technical report, Stanford University, 1993. [46] David L. Donoho. Unconditional bases are optimal bases for data compression and for statistical estimation. Applied and Computational Harmonic Analysis, 1(1):100–15, 1993. [47] David L. Donoho. Unconditional bases and bit-level compression. Applied and Computational Harmonic Analysis, 3(4):388–92, 1996. [48] David L. Donoho. Fast ridgelet transforms in dimension 2. Personal copy, April 30 1997. [49] David L. Donoho. Digital ridgelet transform via digital polar coordinate transform. Stanford University, 1998.
BIBLIOGRAPHY 175 [50] David L. Donoho. Fast edgelet transforms and applications. Manuscript, September 1998. [51] David L. Donoho. Orthonormal Ridgelets and Linear Singularities. Stanford University, 1998. [52] David L. Donoho. Ridge functions and orthonormal ridgelets. Stanford University, 1998. http://www-stat.stanford.edu/˜donoho/Reports/index.html. [53] David L. Donoho. Sparse components of images and optimal atomic decompositions. Technical report, Stanford University, December 1998. http://wwwstat/˜donoho/Reports/1998/SCA.ps. [54] David L. Donoho. Curvelets. Personal copy, April 1999. [55] David L. Donoho and Stark P. B. Uncertainty principles and signal recovery. SIAM J. Applied Mathematics, 49(3):906–31, 1989. [56] David L. Donoho and Peter J. Huber. The notion of breakdown point. In A Festschrift for Erich L. Lehmann, pages 157–84. Wadsworth Advanced Books and Software, 1983. [57] David L. Donoho and B. F. Logan. Signal recovery and the large sieve. SIAM J. Applied Mathematics, 52(2):577–91, April 1992. [58] David L. Donoho, Stéphane Mallat, and R. von Sachs. Estimating covariance of locally stationary processes: Consistency of best basis methods. In Proceedings of IEEE Time-Frequency and Time-Scale Symposium, Paris,July1996. [59] David L. Donoho, Stéphane Mallat, and R. von Sachs. Estimating Covariance of Locally Stationary Processes: Rates of Convergence of Best Basis Methods, February 1998. [60] Serge Dubuc and Gilles Deslauriers, editors. Spline Functions and the Theory of Wavelets. American Mathematical Society, 1999. [61] P. Duhamel and C. Guillemot. Polynomial transform computation of the 2-d dct. In ICASSP 1990, International Conference on Acoustics, Speech and Signal Processing, volume 3, pages 1515–18, 1990.
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SPARSE IMAGE REPRESENTATION VIA COM
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I certify that I have read this dis
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To find a sparse image representati
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Abstract We consider sparse image d
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xii
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2.3 Discussion.....................
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6 Simulations 119 6.1 Dictionary...
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xviii
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List of Figures 2.1 Shannon’s sch
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A.3 Edgelet transform of the wood g
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Nomenclature Special sets N .......
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List of Abbreviations BCR .........
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Chapter 1 Introduction 1.1 Overview
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Chapter 2 Sparsity in Image Coding
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2.1. IMAGE CODING 5 INFORMATION SOU
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2.1. IMAGE CODING 7 2.1.2 Source an
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2.1. IMAGE CODING 9 x ✲ T y ERROR
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2.1. IMAGE CODING 11 where Q stands
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2.2. SPARSITY AND COMPRESSION 13 Pr
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2.2. SPARSITY AND COMPRESSION 15 av
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2.2. SPARSITY AND COMPRESSION 17 wi
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2.2. SPARSITY AND COMPRESSION 19 lo
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2.3. DISCUSSION 21 tail compact. Th
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2.4. PROOF 23 The index l does not
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Chapter 3 Image Transforms and Imag
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27 Some of the figures show the bas
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3.1. DCT AND HOMOGENEOUS COMPONENTS
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3.2. WAVELETS AND POINT SINGULARITI
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3.3. EDGELETS AND LINEAR SINGULARIT
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3.4. OTHER TRANSFORMS 67 uncertaint
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3.4. OTHER TRANSFORMS 69 Chirplets
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3.4. OTHER TRANSFORMS 71 Folding. A
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3.4. OTHER TRANSFORMS 73 We can app
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3.5. DISCUSSION 75 give only a few
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3.7. PROOFS 77 the ijth component o
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3.7. PROOFS 79 Similarly, we have [
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Chapter 4 Combined Image Representa
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4.2. SPARSE DECOMPOSITION 83 interi
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4.3. MINIMUM l 1 NORM SOLUTION 85 l
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4.4. LAGRANGE MULTIPLIERS 87 ρ( x
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4.5. HOW TO CHOOSE ρ AND λ 89 3 (
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4.6. HOMOTOPY 91 A way to interpret
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4.7. NEWTON DIRECTION 93 4.7 Newton
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4.9. ITERATIVE METHODS 95 1. Avoidi
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4.11. DISCUSSION 97 ρ(β) =‖β
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4.12. PROOFS 99 4.12.2 Proof of The
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4.12. PROOFS 101 case of (4.16). Co
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Chapter 5 Iterative Methods This ch
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5.1. OVERVIEW 105 the k-th iteratio
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5.1. OVERVIEW 107 5.1.4 Preconditio
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5.2. LSQR 109 among all the block d
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5.2. LSQR 111 5.2.3 Algorithm LSQR
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5.3. MINRES 113 2. For k =1, 2,...,
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5.3. MINRES 115 using the precondit
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5.4. DISCUSSION 117 From (I + S 1 )
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Chapter 6 Simulations Section 6.1 d
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6.3. DECOMPOSITION 121 10 5 5 5 20
Page 151 and 152: 6.4. DECAY OF COEFFICIENTS 123 10 2
Page 153 and 154: 6.5. COMPARISON WITH MATCHING PURSU
Page 155 and 156: 6.6. SUMMARY OF COMPUTATIONAL EXPER
Page 157 and 158: Chapter 7 Future Work In the future
Page 159 and 160: 7.2. MODIFYING EDGELET DICTIONARY 1
Page 161 and 162: 7.3. ACCELERATING THE ITERATIVE ALG
Page 163 and 164: Appendix A Direct Edgelet Transform
Page 165 and 166: A.2. EXAMPLES 137 edgelet transform
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Page 169 and 170: A.3. DETAILS 141 (a) Lenna image (b
Page 171 and 172: A.3. DETAILS 143 Ordering of Dyadic
Page 173 and 174: A.3. DETAILS 145 (1,K +1), (1,K +2)
Page 175 and 176: A.3. DETAILS 147 x 1 , y 1 x 2 , y
Page 177 and 178: Appendix B Fast Edgelet-like Transf
Page 179 and 180: B.1. TRANSFORMS FOR 2-D CONTINUOUS
Page 181 and 182: B.2. DISCRETE ALGORITHM 153 B.2.1 S
Page 183 and 184: B.2. DISCRETE ALGORITHM 155 extensi
Page 185 and 186: B.2. DISCRETE ALGORITHM 157 For the
Page 187 and 188: B.3. ADJOINT OF THE FAST TRANSFORM
Page 189 and 190: B.4. ANALYSIS 161 above matrix, whi
Page 191 and 192: B.5. EXAMPLES 163 B.5 Examples B.5.
Page 193 and 194: B.5. EXAMPLES 165 And so on. Note f
Page 195 and 196: B.6. MISCELLANEOUS 167 It takes abo
Page 197 and 198: B.6. MISCELLANEOUS 169 The function
Page 199 and 200: Bibliography [1] Sensor Data Manage
Page 201: BIBLIOGRAPHY 173 [24] C. Victor Che
Page 205 and 206: BIBLIOGRAPHY 177 [75] Vivek K. Goya
Page 207 and 208: BIBLIOGRAPHY 179 [100] Stéphane Ma
Page 209 and 210: BIBLIOGRAPHY 181 [127] C. E. Shanno
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