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240 BIBLIOGRAPHY [42] F.R. Gantmacher. The Theory of Matrices, volume 2. Chelsea Publishing Company, 1959. [cited at p. 166, 168, 172, 173, 174, 175, 177] [43] I.M. Gelfand, M.M. Kapranov, and A.V. Zelevinsky. Discriminants, Resultants and Multidimensional Determinants. Birkhäuser Verlag, 1994. [cited at p. 29] [44] A. Giovini, T. Mora, G. Niesi, L. Robbiano, and C. Traverso. “One sugar cube, please”, or Selection strategies in the Buchberger Algorithm. In S. Watt, editor, Proceedings ISSAC’91, pages 49–54, New York, 1991. ACM Press. [cited at p. 23] [45] G. Greuel and G. Pfister. A SINGULAR Introduction to Commutative Algebra (http://www.singular.uni-kl.de). Springer Verlag, 2002. [cited at p. 25] [46] G. Hadley. Nonlinear and dynamic programming. Addison-Wesley, 1964. [cited at p. 100] [47] B. Hanzon and M. Hazewinkel. Constructive Algebra and Systems Theory. Royal Netherlands Academy of Arts and Sciences, Amsterdam, 2006. [cited at p. 26, 36] [48] B. Hanzon and D. Jibetean. Global minimization of a multivariate polynomial using matrix methods. Journal of Global Optimization, 27:1–23, 2003. [cited at p. 3, 26, 35, 36, 44, 45, 229, 234, 257, 261] [49] B. Hanzon and J.M. Maciejowski. Constructive algebra methods for the L 2 problem for stable linear systems. Automatica, 32(12):1645–1657, 1996. [cited at p. 134] [50] B. Hanzon, J.M. Maciejowski, and C.T. Chou. Optimal H 2 order–one reduction by solving eigenproblems for polynomial equations. ArXiv e–prints, 706, june 2007. [cited at p. 3, 5, 7, 26, 36, 135, 136, 140, 141, 143, 145, 146, 147, 148, 152, 153, 154, 155, 156, 229, 232, 233, 235, 257, 258, 259, 261, 263] [51] B. Hassett. Introduction to Algebraic Geometry. Cambridge University Press, 2007. [cited at p. 11] [52] S. Haykin. Adaptive filter theory. Prentice Hall, 3th edition, 1991. [cited at p. 101] [53] J. Heijman. A parallel approach to polynomial optimization. Master Thesis, Maastricht University, MICC (Department Knowledge Engineering), 2007. [cited at p. 4, 79, 112, 115, 117] [54] D. Henrion and J.B. Lasserre. GloptiPoly: Global optimization over polynomials with Matlab and SeDuMi. ACM Transactions on Mathematical Software (TOMS), 29(2):165–194, 2003. [cited at p. 111] [55] N.J. Higham, R.C. Li, and F. Tisseur. Backward error of polynomial eigenproblems solved by linearization. SIAM Journal on Matrix Analysis and Applications, 29(4):1218–1241, 2007. [cited at p. 166, 167] [56] N.J. Higham, D.S. Mackey, N. Mackey, and F. Tisseur. Symmetric linearizations for matrix polynomials. SIAM Journal on Matrix Analysis and Applications, 29(1):143– 159, 2006. [cited at p. 167] [57] M.E. Hochstenbach, T. Kosir, and B. Plestenjak. A Jacobi-Davidson type method for the two-parameter eigenvalue problem. SIAM Journal on Matrix Analysis and Applications, 26(2):477–497, 2005. [cited at p. 198]
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Stellingen behorende bij het proefs
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ALGEBRAIC POLYNOMIAL SYSTEM SOLVING
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ALGEBRAIC POLYNOMIAL SYSTEM SOLVING
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For all those I love...
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ii CONTENTS II Global Optimization
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iv CONTENTS 12.2 Directions for fur
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Chapter 1 Introduction 1.1 Motivati
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1.3. RESEARCH QUESTIONS 5 The goal
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1.4. THESIS OUTLINE 7 Jacobi-Davids
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Part I General introduction and bac
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12 CHAPTER 2. ALGEBRAIC BACKGROUND
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Chapter 3 Solving polynomial system
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3.1. SOLVING POLYNOMIAL EQUATIONS I
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3.2. METHODS FOR SOLVING POLYNOMIAL
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3.3. THE STETTER-MÖLLER MATRIX MET
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3.5. EXAMPLE 37 applying the Stette
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3.5. EXAMPLE 39 be: I = 〈13x 2 2
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Chapter 4 Global optimization of mu
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4.1. THE GLOBAL MINIMUM OF A DOMINA
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4.3. AN EXAMPLE 47 Using the matric
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4.3. AN EXAMPLE 49 the Stetter-Möl
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Chapter 5 An nD-systems approach in
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5.1. THE ND-SYSTEM 53 cerned with t
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5.1. THE ND-SYSTEM 55 Example 5.1.
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5.1. THE ND-SYSTEM 57 Figure 5.2: T
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5.3. EFFICIENCY OF THE ND-SYSTEMS A
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Chapter 6 Iterative eigenvalue solv
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6.2. THE JACOBI-DAVIDSON METHOD 83
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6.2. THE JACOBI-DAVIDSON METHOD 85
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6.4. PROJECTION TO STETTER-STRUCTUR
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6.5. A JACOBI-DAVIDSON METHOD FOR C
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6.5. A JACOBI-DAVIDSON METHOD FOR C
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108 CHAPTER 7. NUMERICAL EXPERIMENT
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Part III H 2 Model-order Reduction
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136 CHAPTER 8. H 2 MODEL-ORDER REDU
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Chapter 10 H 2 Model-order reductio
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10.1. SOLVING THE SYSTEM OF QUADRAT
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10.1. SOLVING THE SYSTEM OF QUADRAT
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10.2. LINEARIZING A POLYNOMIAL EIGE
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10.3. THE KRONECKER CANONICAL FORM
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10.4. COMPUTING THE APPROXIMATION G
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10.6. EXAMPLES 181 5. Compute the n
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10.6. EXAMPLES 183 Figure 10.1: Spa
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10.6. EXAMPLES 185 Figure 10.3: The
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10.6. EXAMPLES 187 Figure 10.5: Imp
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Page 270 and 271: 256 APPENDIX B. POLYNOMIAL TEST SET
Page 272 and 273: 258 SUMMARY vector. This routine is
Page 274 and 275: 260 SUMMARY globally optimal approx
Page 276 and 277: 262 SAMENVATTING De matrix-vrije im
Page 278 and 279: 264 SAMENVATTING eigenwaarde proble
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Page 283 and 284: List of Symbols and Abbreviations A
Page 285 and 286: LIST OF FIGURES 271 7.7 Residual no
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