v2004.06.19 - Convex Optimization

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470 BIBLIOGRAPHY[154] George P. H. Styan and Akimichi Takemura. Rank additivity and matrixpolynomials. Technical Report 57, Stanford University, Departmentof Statistics, September 1982.[155] Alston S. Householder. The Theory of Matrices in Numerical Analysis.Dover, 1975.[156] Alex Reznik. Problem 3.41, from Sergio Verdú. Multiuser Detection.Cambridge University Press, 1998.www.ee.princeton.edu/~verdu/mud/solutions/3/3.41.areznik.pdf,2001.[157] John Clifford Gower and Garmt B. Dijksterhuis. Procrustes Problems.Oxford University Press, 2004.[158] Rajendra Bhatia. Matrix Analysis. Springer-Verlag, 1997.[159] Alan J. Hoffman and Helmut W. Wielandt. The variation of the spectrumof a normal matrix. Duke Mathematical Journal, 20:37–40, 1953.[160] Kurt Anstreicher and Henry Wolkowicz. On Lagrangian relaxation ofquadratic matrix constraints. SIAM Journal on Matrix Analysis andApplications, 22(1):41–55, 2000.[161] Alan Edelman, Tomás A. Arias, and Steven T. Smith. The geometryof algorithms with orthogonality constraints. SIAM Journal on MatrixAnalysis and Applications, 20(2):303–353, 1998.[162] Peter H. Schönemann. A generalized solution of the orthogonalProcrustes problem. Psychometrika, 31(1):1–10, 1966.[163] Pythagoras Papadimitriou. Parallel Solution of SVD-Related Problems,With Applications. PhD thesis, Department of Mathematics, Universityof Manchester, October 1993.[164] A. W. Bojanczyk and A. Lutoborski. The Procrustes problemfor orthogonal Stiefel matrices. SIAM Journal on Scientific Computing,21(4):1291–1304, February 1998. Date is electronic publication:http://citeseer.ist.psu.edu/500185.html
BIBLIOGRAPHY 471[165] Nick Higham. Matrix Procrustes problems, 1995.http://www.ma.man.ac.uk/~higham/talksLecture notes.[166] James Gleik. Isaac Newton. Pantheon Books, 2003.[167] Peter H. Schönemann, Tim Dorcey, and K. Kienapple. Subadditive concatenationin dissimilarity judgements. Perception and Psychophysics,38:1–17, 1985.[168] Bernard Widrow and Samuel D. Stearns. Adaptive Signal Processing.Prentice-Hall, 1985.[169] Mike Brookes. Matrix reference manual: Matrix calculus, 2002.http://www.ee.ic.ac.uk/hp/staff/dmb/matrix/intro.html[170] Chi-Tsong Chen. Linear System Theory and Design. Oxford UniversityPress, 1999.[171] E. H. Moore. On the reciprocal of the general algebraic matrix. Bulletinof the American Mathematical Society, 26:394–395, 1920. Abstract.[172] T. N. E. Greville. Note on the generalized inverse of a matrix product.SIAM Review, 8:518–521, 1966.[173] Charles L. Lawson and Richard J. Hanson. Solving Least Squares Problems.SIAM, 1995.[174] Roger Penrose. A generalized inverse for matrices. In Proceedings ofthe Cambridge Philosophical Society, volume 51, pages 406–413, 1955.[175] Akimichi Takemura. On generalizations of Cochran’s theorem and projectionmatrices. Technical Report 44, Stanford University, Departmentof Statistics, August 1980.[176] George P. H. Styan. A review and some extensions of Takemura’sgeneralizations of Cochran’s theorem. Technical Report 56, StanfordUniversity, Department of Statistics, September 1982.[177] Howard Anton. Elementary Linear Algebra. Wiley, second edition,1977.
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Euclidean Distance GeometryviaConve
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for Jennie Columba♦♦Antonio♦a
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illustrations: Mayura Drawtypesetti
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8 CONTENTS2.7 Convex polyhedra . .
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10 CONTENTS5.3 EDM cone by inverse
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12 CONTENTSB.2 Doublet . . . . . .
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14 CONTENTSG Notation and some defi
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16 CHAPTER 1. PRELUDEThese pages co
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18 CHAPTER 1. PRELUDEChapter 8 inve
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20 CHAPTER 2. CONVEX GEOMETRY2.1 Co
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22 CHAPTER 2. CONVEX GEOMETRY(a)R(b
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24 CHAPTER 2. CONVEX GEOMETRYTogeth
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26 CHAPTER 2. CONVEX GEOMETRYand wh
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28 CHAPTER 2. CONVEX GEOMETRY2.1.2
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30 CHAPTER 2. CONVEX GEOMETRYwhere
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32 CHAPTER 2. CONVEX GEOMETRYLike b
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34 CHAPTER 2. CONVEX GEOMETRYGiven
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36 CHAPTER 2. CONVEX GEOMETRYGiven
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38 CHAPTER 2. CONVEX GEOMETRYThis r
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42 CHAPTER 2. CONVEX GEOMETRY(a)Yy
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44 CHAPTER 2. CONVEX GEOMETRY1) If
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46 CHAPTER 2. CONVEX GEOMETRY2.4.1.
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48 CHAPTER 2. CONVEX GEOMETRYABCDFi
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50 CHAPTER 2. CONVEX GEOMETRYAn aff
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52 CHAPTER 2. CONVEX GEOMETRYXXFigu
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54 CHAPTER 2. CONVEX GEOMETRYcone S
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58 CHAPTER 2. CONVEX GEOMETRYBCADFi
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64 CHAPTER 2. CONVEX GEOMETRY√2β
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66 CHAPTER 2. CONVEX GEOMETRYwhich
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68 CHAPTER 2. CONVEX GEOMETRYequals
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70 CHAPTER 2. CONVEX GEOMETRYAssumi
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74 CHAPTER 2. CONVEX GEOMETRYFrom t
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76 CHAPTER 2. CONVEX GEOMETRYFor an
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80 CHAPTER 2. CONVEX GEOMETRY• (S
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82 CHAPTER 2. CONVEX GEOMETRYmerely
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84 CHAPTER 2. CONVEX GEOMETRYy ∈
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88 CHAPTER 2. CONVEX GEOMETRYthat f
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90 CHAPTER 2. CONVEX GEOMETRYWhen X
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92 CHAPTER 2. CONVEX GEOMETRY2.9 Fo
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94 CHAPTER 2. CONVEX GEOMETRYFor γ
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96 CHAPTER 2. CONVEX GEOMETRYConver
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98 CHAPTER 2. CONVEX GEOMETRYAssume
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100 CHAPTER 2. CONVEX GEOMETRYwhere
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102 CHAPTER 2. CONVEX GEOMETRYbiort
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X 1 =4X †T1 =⎡⎢⎣⎡⎢⎣10
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106 CHAPTER 2. CONVEX GEOMETRYFigur
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108 CHAPTER 2. CONVEX GEOMETRY∂K
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110 CHAPTER 2. CONVEX GEOMETRYΓ 4
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112 CHAPTER 2. CONVEX GEOMETRY∂K
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114 CHAPTER 3. GEOMETRY OF CONVEX F
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130 CHAPTER 4. EUCLIDEAN DISTANCE M
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204 CHAPTER 5. EDM CONEFor now we i
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206 CHAPTER 5. EDM CONE5.1 Polyhedr
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208 CHAPTER 5. EDM CONE5.2.1 Range
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210 CHAPTER 5. EDM CONEA statement
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212 CHAPTER 5. EDM CONEIn particula
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214 CHAPTER 5. EDM CONE5.4 Correspo
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216 CHAPTER 5. EDM CONE5.4.2 Monoto
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218 CHAPTER 5. EDM CONEsvec ∂ S 2
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220 CHAPTER 5. EDM CONE5.6 Dual EDM
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222 CHAPTER 5. EDM CONE5.6.2.1 Scho
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224 CHAPTER 5. EDM CONE
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226 CHAPTER 6. CONVEX OPTIMIZATIONT
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230 CHAPTER 6. CONVEX OPTIMIZATION6
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232 CHAPTER 6. CONVEX OPTIMIZATIONW
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234 CHAPTER 6. CONVEX OPTIMIZATION6
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236 CHAPTER 6. CONVEX OPTIMIZATIONF
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238 CHAPTER 6. CONVEX OPTIMIZATIONt
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242 CHAPTER 6. CONVEX OPTIMIZATION
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244 CHAPTER 7. EDM PROXIMITY7.0.1 L
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246 CHAPTER 7. EDM PROXIMITY......
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248 CHAPTER 7. EDM PROXIMITYparticu
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250 CHAPTER 7. EDM PROXIMITYmatrice
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252 CHAPTER 7. EDM PROXIMITY7.1.3 C
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254 CHAPTER 7. EDM PROXIMITYis dime
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256 CHAPTER 7. EDM PROXIMITYFor lac
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258 CHAPTER 7. EDM PROXIMITYH is no
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260 CHAPTER 7. EDM PROXIMITYwhere
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262 CHAPTER 7. EDM PROXIMITYbe zero
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264 CHAPTER 7. EDM PROXIMITYFor the
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266 CHAPTER 7. EDM PROXIMITYK ∗ 2
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K ρ+2λ268 CHAPTER 7. EDM PROXIMIT
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270 CHAPTER 7. EDM PROXIMITYsimply
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272 CHAPTER 7. EDM PROXIMITY
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274 CHAPTER 8. EDM COMPLETION(b)(c)
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276 CHAPTER 8. EDM COMPLETION8.1.0.
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278 CHAPTER 8. EDM COMPLETION8.2 Re
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280 CHAPTER 8. EDM COMPLETION8.2.2
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282 CHAPTER 8. EDM COMPLETIONR 2 ha
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284 CHAPTER 8. EDM COMPLETION0.50.4
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290 CHAPTER 9. PIANO TUNING
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292 APPENDIX A. LINEAR ALGEBRAmatri
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294 APPENDIX A. LINEAR ALGEBRACorol
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296 APPENDIX A. LINEAR ALGEBRA...an
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298 APPENDIX A. LINEAR ALGEBRAλ (
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300 APPENDIX A. LINEAR ALGEBRA• M
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302 APPENDIX A. LINEAR ALGEBRA• F
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304 APPENDIX A. LINEAR ALGEBRA• F
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306 APPENDIX A. LINEAR ALGEBRAA.3.1
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310 APPENDIX A. LINEAR ALGEBRAThe o
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314 APPENDIX A. LINEAR ALGEBRAThe p
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316 APPENDIX A. LINEAR ALGEBRAR{u i
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320 APPENDIX A. LINEAR ALGEBRANow s
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322 APPENDIX A. LINEAR ALGEBRAwhich
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324 APPENDIX A. LINEAR ALGEBRA
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326 APPENDIX B. SIMPLE MATRICESB.1
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328 APPENDIX B. SIMPLE MATRICESB.1.
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330 APPENDIX B. SIMPLE MATRICESby t
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332 APPENDIX B. SIMPLE MATRICESN(u
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334 APPENDIX B. SIMPLE MATRICESthe
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340 APPENDIX B. SIMPLE MATRICESThis
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342 APPENDIX B. SIMPLE MATRICES
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344 APPENDIX C. SOME OPTIMAL ANALYT
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352 APPENDIX D. MATRIX CALCULUSwhil
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354 APPENDIX D. MATRIX CALCULUSa cu
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356 APPENDIX D. MATRIX CALCULUSprod
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358 APPENDIX D. MATRIX CALCULUS∇
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360 APPENDIX D. MATRIX CALCULUSin m
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362 APPENDIX D. MATRIX CALCULUSNoti
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364 APPENDIX D. MATRIX CALCULUS⎡
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366 APPENDIX D. MATRIX CALCULUSD.1.
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368 APPENDIX D. MATRIX CALCULUSExam
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370 APPENDIX D. MATRIX CALCULUSD.2
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372 APPENDIX D. MATRIX CALCULUS
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382 APPENDIX D. MATRIX CALCULUS
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384 APPENDIX E. PSEUDOINVERSE, PROJ
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Page 420 and 421: 420 APPENDIX E. PSEUDOINVERSE, PROJ
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Page 446 and 447: 446 APPENDIX G. NOTATION AND SOME D
Page 456 and 457: 456 BIBLIOGRAPHY[9] Günter M. Zieg
Page 458 and 459: 458 BIBLIOGRAPHY[28] Roger A. Horn
Page 460 and 461: 460 BIBLIOGRAPHY[54] Hong-Xuan Huan
Page 462 and 463: 462 BIBLIOGRAPHY[76] Peter Gritzman
Page 464 and 465: 464 BIBLIOGRAPHYtors, Handbook of S
Page 466 and 467: 466 BIBLIOGRAPHY[117] Shao-Po Wu an
Page 468 and 469: 468 BIBLIOGRAPHY[134] Maryam Fazel,
Page 472 and 473: 472 BIBLIOGRAPHY[178] Jean-Baptiste
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v2004.06.19 - Convex Optimization

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