Verfügbarkeit: Handbook of matrices | Technische Universität München

Handbook of matrices:

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Bibliographische Detailangaben
Beteilige Person:	Lütkepohl, Helmut 1951- (VerfasserIn)
Format:	Buch
Sprache:	Englisch
Veröffentlicht:	Chichester [u.a.] Wiley 1996
Schlagwörter:	Matrices Matrizenrechnung Matrix > Mathematik
Links:	http://bvbr.bib-bvb.de:8991/F?func=service&doc_library=BVB01&local_base=BVB01&doc_number=007472960&sequence=000002&line_number=0001&func_code=DB_RECORDS&service_type=MEDIA
Umfang:	XVI, 304 S.
ISBN:	0471966886 0471970158

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Datensatz im Suchindex

DE-BY-TUM_call_number	0002 MAT 150b 96 A 3717 0102 MAT 150b 2006 A 1796
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adam_text	Contents Preface .................................... xi List of Symbols .............................. xiii 1 Definitions, Notation, Terminology ................ 1 1.1 Basic Notation and Terminology ................. 1 1.2 Operations Relating Matrices ................... 3 1.3 Inequality Relations Between Matrices .............. 4 1.4 Operations Related to Individual Matrices ............ 4 1.5 Some Special Matrices ....................... 9 1.6 Some Terms and Quantities Related to Matrices ........ 11 2 Rules for Matrix Operations .................... 15 2.1 Rules Related to Matrix Sums and Differences ......... 15 2.2 Rules Related to Matrix Multiplication .............. 16 2.3 Rules Related to Multiplication by a Scalar ........... 18 2.4 Rules for the Kronecker Product ................. 19 2.5 Rules for the Hadamard Product ................. 20 2.6 Rules for Direct Sums ....................... 22 3 Matrix Valued Functions of a Matrix .............. 23 3.1 The Transpose ........................... 23 3.2 The Conjugate ........................... 24 3.3 The Conjugate Transpose ..................... 25 3.4 The Adjoint of a Square Matrix .................. 27 3.5 The Inverse of a Square Matrix .................. 27 3.5.1 General Results ....................... 27 3.5.2 Inverses Involving Sums and Differences ......... 28 3.5.3 Partitioned Inverses .................... 29 3.5.4 Inverses Involving Commutation, Duplication and Elimination Matrices .................. 31 vi CONTENTS 3.6 Generalized Inverses ........................ 32 3.6.1 General Results ....................... 32 3.6.2 The Moore-Penrose Inverse ................ 34 3.7 Matrix Powers ........................... 37 3.8 The Absolute Value ........................ 39 4 Trace, Determinant and Rank of a Matrix ........... 41 4.1 The Trace .............................. 41 4.1.1 General Results ....................... 41 4.1.2 Inequalities Involving the Trace .............. 43 4.1.3 Optimization of Functions Involving the Trace ..... 45 4.2 The Determinant .......................... 47 4.2.1 General Results ....................... 47 4.2.2 Determinants of Partitioned Matrices .......... 49 4.2.3 Determinants Involving Duplication Matrices ...... 51 4.2.4 Determinants Involving Elimination Matrices ...... 52 4.2.5 Determinants Involving Both Duplication and Elimina¬ tion Matrices ...................... 53 4.2.6 Inequalities Related to Determinants ........... 54 4.2.7 Optimization of Functions Involving a Determinant ... 56 4.3 The Rank of a Matrix ....................... 58 4.3.1 General Results ....................... 58 4.3.2 Matrix Decompositions Related to the Rank ...... 60 4.3.3 Inequalities Related to the Rank ............. 61 5 Eigenvalues and Singular Values ................. 63 5.1 Definitions ............................. 63 5.2 Properties of Eigenvalues and Eigenvectors ........... 64 5.2.1 General Results ....................... 64 5.2.2 Optimization Properties of Eigenvalues ......... 67 5.2.3 Matrix Decompositions Involving Eigenvalues ...... 69 5.3 Eigenvalue Inequalities ....................... 72 5.3.1 Inequalities for the Eigenvalues of a Single Matrix ... 72 5.3.2 Relations Between Eigenvalues of More Than One Matrix 74 5.4 Results for the Spectral Radius .................. 76 5.5 Singular Values ........................... 78 5.5.1 General Results ....................... 78 5.5.2 Inequalities ......................... 80 6 Matrix Decompositions and Canonical Forms ......... 83 6.1 Complex Matrix Decompositions ................. 83 6.1.1 Jordan Type Decompositions ............... 83 6.1.2 Diagonal Decompositions ................. 85 CONTENTS vü 6.1.3 Other Triangular Decompositions and Factorizations . . 86 6.1.4 Miscellaneous Decompositions ............... 88 6.2 Real Matrix Decompositions .................... 89 6.2.1 Jordan Decompositions .................. 89 6.2.2 Other Real Block Diagonal and Diagonal Decompositions 90 6.2.3 Other Triangular and Miscellaneous Reductions ..... 92 7 Vectorization Operators ....................... 95 7.1 Definitions .............................. 95 7.2 Rules for the vec Operator ..................... 97 7.3 Rules for the vech Operator .................... 99 8 Vector and Matrix Norms .....................101 8.1 General Definitions .........................101 8.2 Specific Norms and Inner Products ................103 8.3 Results for General Norms and Inner Products .........104 8.4 Results for Matrix Norms .....................106 8.4.1 General Matrix Norms ...................106 8.4.2 Induced Matrix Norms ...................108 8.5 Properties of Special Norms ....................109 8.5.1 General Results .......................109 8.5.2 Inequalities ......................... Ill 9 Properties of Special Matrices ...................113 9.1 Circulant Matrices .........................113 9.2 Commutation Matrices .......................115 9.2.1 General Properties .....................116 9.2.2 Kronecker Products ....................117 9.2.3 Relations With Duplication and Elimination Matrices . 118 9.3 Convergent Matrices ........................119 9.4 Diagonal Matrices .........................120 9.5 Duplication Matrices ........................122 9.5.1 General Properties .....................122 9.5.2 Relations With Commutation and Elimination Matrices 123 9.5.3 Expressions With vec and vech Operators ........123 9.5.4 Duplication Matrices and Kronecker Products ......124 9.5.5 Duplication Matrices, Elimination Matrices and Kro- necker Products .................... 126 9.6 Elimination Matrices ........................127 9.6.1 General Properties .....................127 9.6.2 Relations With Commutation and Duplication Matrices 127 9.6.3 Expressions With vec and vech Operators ........128 9.6.4 Elimination Matrices and Kronecker Products ......128 viii CONTENTS 9.6.5 Elimination Matrices, Duplication Matrices and Kro- necker Products .................... 130 9.7 Hermitian Matrices .........................131 9.7.1 General Results ....................... 131 9.7.2 Eigenvalues of Hermitian Matrices ............ 133 9.7.3 Eigenvalue Inequalities ................... 134 9.7.4 Decompositions of Hermitian Matrices .......... 137 9.8 Idempotent Matrices ........................ 138 9.9 Nonnegative, Positive and Stochastic Matrices .......... 139 9.9.1 Definitions ......................... 139 9.9.2 General Results ....................... 140 9.9.3 Results Related to the Spectral Radius .......... 141 9.10 Orthogonal Matrices ........................ 142 9.10.1 General Results .......................143 9.10.2 Decompositions of Orthogonal Matrices .........144 9.11 Partitioned Matrices ........................144 9.11.1 General Results ....................... 145 9.11.2 Determinants of Partitioned Matrices .......... 146 9.11.3 Partitioned Inverses .................... 147 9.11.4 Partitioned Generalized Inverses ............. 148 9.11.5 Partitioned Matrices Related to Duplication Matrices . 149 9.12 Positive Definite, Negative Definite and Semidefinite Matrices . 150 9.12.1 General Properties .....................151 9.12.2 Eigenvalue Results .....................153 9.12.3 Decomposition Theorems for Definite Matrices .....154 9.13 Symmetric Matrices ........................156 9.13.1 General Properties ..................... 156 9.13.2 Symmetry and Duplication Matrices ........... 157 9.13.3 Eigenvalues of Symmetric Matrices ............ 158 9.13.4 Eigenvalue Inequalities ................... 159 9.13.5 Decompositions of Symmetric and Skew-Symmetric Matrices ......................... 163 9.14 Triangular Matrices ........................164 9.14.1 Properties of General Triangular Matrices ........ 164 9.14.2 Triangularity, Elimination and Duplication Matrices . . 165 9.14.3 Properties of Strictly Triangular Matrices ........ 167 9.15 Unitary Matrices .......................... 167 10 Vector and Matrix Derivatives ..................171 10.1 Notation ...............................171 10.2 Gradients and Hessian Matrices of Real Valued Functions with Vector Arguments ....................... 174 10.2.1 Gradients ..........................174 CONTENTS ix 10.2.2 Hessian Matrices ......................175 10.3 Derivatives of Real Valued Functions with Matrix Arguments . 176 10.3.1 General and Miscellaneous Rules ............. 176 10.3.2 Derivatives of the Trace .................. 177 10.3.3 Derivatives of Determinants ................ 181 10.4 J acobian Matrices of Linear Functions .............. 183 10.4.1 Linear Functions with General Matrix Arguments . . . 183 10.4.2 Linear Functions with Symmetric Matrix Arguments . . 185 10.4.3 Linear Functions with Triangular Matrix Arguments . . 187 10.4.4 Linear Functions of Vector and Matrix Valued Func¬ tions with Vector Arguments ............. 188 10.5 Product Rules ............................189 10.5.1 Matrix Products ...................... 189 10.5.2 Kronecker and Hadamard Products ........... 192 10.5.3 Functions with Symmetric Matrix Arguments ...... 193 10.5.4 Functions with Lower Triangular Matrix Arguments . . 195 10.5.5 Products of Matrix Valued Functions with Vector Arguments ....................... 196 10.6 Jacobian Matrices of Functions Involving Inverse Matrices . . . 198 10.6.1 Matrix Products ...................... 198 10.6.2 Kronecker and Hadamard Products ........... 199 10.6.3 Matrix Valued Functions with Vector Arguments .... 200 10.7 Chain Rules and Miscellaneous Jacobian Matrices ....... 202 10.8 Jacobian Determinants ....................... 204 10.8.1 Linear Transformations ..................204 10.8.2 Nonlinear Transformations ................ 206 10.9 Matrix Valued Functions of a Scalar Variable ..........208 11 Polynomials, Power Series and Matrices ............211 11.1 Definitions and Notations .....................211 11.1.1 Definitions and Notation Related to Polynomials . . . .211 11.1.2 Matrices Related to Polynomials .............213 11.1.3 Polynomials and Power Series Related to Matrices . . . 214 11.2 Results Relating Polynomials and Matrices ...........215 11.3 Polynomial Matrices ........................217 11.3.1 Definitions .........................217 11.3.2 Results for Polynomial Matrices .............221 Appendix A Dictionary of Matrices and Related Terms .... 225 References ..................................287 Index .....................................291
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title	Handbook of matrices
title_auth	Handbook of matrices
title_exact_search	Handbook of matrices
title_full	Handbook of matrices H. Lütkepohl
title_fullStr	Handbook of matrices H. Lütkepohl
title_full_unstemmed	Handbook of matrices H. Lütkepohl
title_short	Handbook of matrices
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