Calculul valorilor si vectorilor proprii

More documents

Recommendations

Info

534 BIBLIOGRAFIE [14] S.P. Chan, B.N. Parlett. Algorithm 517: a Program for Computing the Condition Numbers of Matrix Eigenvalues without Computing Eigenvectors. ACM Trans. Math. Soft., 3:186–203, 1977. [15] T.F. Chan. Rank-Revealing QR Factorizations. Lin. Alg. and its Applic., 88/89:67–82, 1987. [16] A.K. Cline, C.B. Moler, G.W. Stewart, J.H. Wilkinson. An Estimate for the Condition Number of a Matrix. SIAM J.Numer.Anal., 16(2):368–375, April 1979. [17] A.K. Cline, R.J. Plemmons. L 2 Solutions to Underdetermined Linear Systems. SIAM Review, 18:92–106, 1976. [18] J.J.M. Cuppen. A Divide and Conquer Method for the Symmetric Eigenproblem. Numerische Mathematik, 36:177–195, 1981. [19] J.Demmel, W.Kahan. AccurateSingularValuesofBidiagonalMatrices. SIAM J.Sci.Stat.Comput., 11(5):873–912, September 1990. [20] J.J. Dongarra, J. Du Croz, S. Hammarling, I. Duff. A Set of Level-3 Basic LinearAlgebraSubprograms. ACM Trans.Math.Software, 16:1–17,18–28,1990. [21] J.J. Dongarra, D.W. Walker. Software Libraries for Linear Algebra Computations on High Performance Computers. SIAM Review, 37:151–180, 1995. [22] B. Dumitrescu. Improving and Estimating the Accuracy of Strassen’s Algorithm. Numerische Mathematik, 79(4):485-499, 1998. [23] L. Elsner, J.G. Sun. Perturbation Theorems for the Generalized Eigenvalue Problem. Lin. Alg. and its Applic., 48:341–357, 1982. [24] G.E. Forsythe. Pitfalls in Computations or Why a Math Book is not Enough. Amer.Math.Monthly, 77:931–970, 1970. [25] G.E. Forsythe. Computer Methods for Mathematical Computations. Prentice- Hall, 1977. [26] J.G.F. Francis. The QR Transformation: a Unitary Analogue to the LR Transformation, Parts I and II. Comp. J., 4:265–272, 332–345, 1962. [27] W. Givens. Computation of Plane Unitary Rotations Transforming a General Matrix to Triangular form. SIAM J.App.Math., 6:26–50, 1958. [28] I.M. Glazman, I. Liubici. Analiză liniară pe spaţii finit-dimensionale. Ed. Ştiinţifică şi Enciclopedică, 1980. [29] D. Goldberg. What Every Computer Scientist Should Know About Floating- Point Arithmetic. ACM Comp.Surveys, 23(1):5–48, March 1991. [30] G.H. Golub, W. Kahan. Calculating the Singular Values and Pseudo-Inverse of a Matrix. SIAM J. Num. Anal. Ser. B 2, 205–224, 1965.
BIBLIOGRAFIE 535 [31] S. Haykin. Adaptive Filter Theory. Prentice Hall, 1991. [32] N.J. Higham. The Accuracy of Floating Point Summation. SIAM J.Sci. Comput., 14(4):783–799, July 1993. [33] N.J. Higham. Stability of the Diagonal Pivoting Method with PartialPivoting. SIAM J.Matrix Anal.Appl., 18(1):52–65, January 1997. [34] A.S. Householder. Unitary Triangularization of a Nonsymmetric Matrix. J. ACM, 5:339–342, 1958. [35] D. Jacobs, editor. The State of the Art in Numerical Analysis. Academic Press, 1977. [36] B. Kȧgström, P. Ling, C. Van Loan. High Performance GEMM-Based Level- 3 BLAS: Sample Routines for Double Precision Real Data. In M. Durand, F. El Dabaghi, editori, High Performance Computing II, pp. 269–281. Elsevier Science Publishers B.V., 1991. [37] T. Kato. Perturbation Theory for Linear Operators. Springer-Verlag, 1966. [38] V.C. Klema, A.J. Laub. The Singular Value Decomposition: Its Computation and Some Applications. IEEE Trans.Auto.Control, AC-25(2):164–180, April 1980. [39] V.N. Kublanovskaya. On Some Algorithms for the Solution of the Complete Eigenvalue Problem. USSR Comp. Math. Phys., 3:637–657, 1961. [40] C.L. Lawson, R.J. Hanson, F.T Krogh, D.R. Kincaid. Basic Linear Algebra Subprograms for FORTRAN Usage. ACM Trans.Math.Software, 5:308–323, 1979. [41] R.S. Martin, C. Reinsch, J.H. Wilkinson. Householder Tridiagonalization of a Symmetric Matrix. Numerische Mathematik, 11:181–195, 1968. [42] R.S. Martin, J.H. Wilkinson. Solution of Symmetric and Unsymmetric Band Equations and the Calculation of Eigenvalues of Band Matrices. Numerische Mathematik, 9:279–301, 1967. [43] R.S. Martin, J.H. Wilkinson. Reduction of the Symmetric Eigenproblem Ax = λBx and Related Problems to Standard Form. Numerische Mathematik, 11:99–110, 1968. [44] C.B. Moler, G.W. Stewart. An Algorithm for Generalized Matrix Eigenvalue Problems. SIAM J. Numer. Anal., 10:241–256, 1973. [45] C.C. Paige. Computing the Generalized Singular Value Decomposition. SIAM J.Sci.Stat.Comput, 7(4):1126–1146, October 1986. [46] B.N. Parlett, C. Reinsch. Balancing a Matrix for Calculation of Eigenvalues and Eigenvectors. Numerische Mathematik, 13:292–304, 1969.
Page 1 and 2:
Capitolul 4 Calculul valorilor şi
Page 3 and 4:
4.1. FORMULAREA PROBLEMEI 211 În a
Page 5 and 6:
4.1. FORMULAREA PROBLEMEI 213 Exemp
Page 7 and 8:
4.1. FORMULAREA PROBLEMEI 215 În c
Page 9 and 10:
4.1. FORMULAREA PROBLEMEI 217 Pasul
Page 11 and 12:
4.1. FORMULAREA PROBLEMEI 219 Demon
Page 13 and 14:
4.1. FORMULAREA PROBLEMEI 221 de un
Page 15 and 16:
4.1. FORMULAREA PROBLEMEI 223 Teore
Page 17 and 18:
4.1. FORMULAREA PROBLEMEI 225 unita
Page 19 and 20:
4.2. FORMA SCHUR 227 Exemplul 4.2 C
Page 21 and 22:
4.2. FORMA SCHUR 229 Lema 4.2 (Defl
Page 23 and 24:
4.2. FORMA SCHUR 231 unde S 11 ∈
Page 25 and 26:
4.3. METODA PUTERII. METODA PUTERII
Page 27 and 28:
Page 29 and 30:
Page 31 and 32:
4.4. ALGORITMUL QR 239 4.4 Algoritm
Page 33 and 34:
4.4. ALGORITMUL QR 241 4.4.1 Reduce
Page 35 and 36:
4.4. ALGORITMUL QR 243 prezentări
Page 37 and 38:
4.4. ALGORITMUL QR 245 i.e. H k+1
Page 39 and 40:
4.4. ALGORITMUL QR 247 Într-adevă
Page 41 and 42:
4.4. ALGORITMUL QR 249 Se observă
Page 43 and 44:
4.4. ALGORITMUL QR 251 B. Strategia
Page 45 and 46:
4.4. ALGORITMUL QR 253 Teorema 4.15
Page 47 and 48:
4.4. ALGORITMUL QR 255 nesingulară
Page 49 and 50:
4.4. ALGORITMUL QR 257 Hessenberg a
Page 51 and 52:
4.4. ALGORITMUL QR 259 cu H 11 ∈
Page 53 and 54:
4.4. ALGORITMUL QR 261 4. [A(k : l,
Page 55 and 56:
4.4. ALGORITMUL QR 263 not Consider
Page 57 and 58:
4.4. ALGORITMUL QR 265 ⎡ H ← HU
Page 59 and 60:
4.4. ALGORITMUL QR 267 structurală
Page 61 and 62:
4.4. ALGORITMUL QR 269 5. S(k:k+1,k
Page 63 and 64:
4.4. ALGORITMUL QR 271 4. % Triangu
Page 65 and 66:
4.4. ALGORITMUL QR 273 elementelor
Page 67 and 68:
4.4. ALGORITMUL QR 275 rotunjire ş
Page 69 and 70:
4.4. ALGORITMUL QR 277 sau ( ρ ki
Page 71 and 72:
4.4. ALGORITMUL QR 279 2. Pentru i
Page 73 and 74:
4.5. CALCULUL VECTORILOR PROPRII 28
Page 75 and 76:
Page 77 and 78:
Page 79 and 80:
4.6. CALCULUL SUBSPAŢIILOR INVARIA
Page 81 and 82:
Page 83 and 84:
Page 85 and 86:
Page 87 and 88:
Page 89 and 90:
4.7. FORMA BLOC-DIAGONALĂ 297 cu m
Page 91 and 92:
4.7. FORMA BLOC-DIAGONALĂ 299 Algo
Page 93 and 94:
4.7. FORMA BLOC-DIAGONALĂ 301 În
Page 95 and 96:
4.7. FORMA BLOC-DIAGONALĂ 303 4.7.
Page 97 and 98:
4.7. FORMA BLOC-DIAGONALĂ 305 atun
Page 99 and 100:
4.7. FORMA BLOC-DIAGONALĂ 307 Vers
Page 101 and 102:
4.7. FORMA BLOC-DIAGONALĂ 309 O pr
Page 103 and 104:
4.7. FORMA BLOC-DIAGONALĂ 311 În
Page 105 and 106:
4.7. FORMA BLOC-DIAGONALĂ 313 rezu
Page 107 and 108:
4.8. ALGORITMUL QR SIMETRIC 315 seo
Page 109 and 110:
4.8. ALGORITMUL QR SIMETRIC 317 Not
Page 111 and 112:
4.8. ALGORITMUL QR SIMETRIC 319 mul
Page 113 and 114:
4.8. ALGORITMUL QR SIMETRIC 321 3.
Page 115 and 116:
4.8. ALGORITMUL QR SIMETRIC 323 ele
Page 117 and 118:
4.8. ALGORITMUL QR SIMETRIC 325 Pen
Page 119 and 120:
4.8. ALGORITMUL QR SIMETRIC 327 tri
Page 121 and 122:
4.9. METODE ALTERNATIVE 329 egalit
Page 123 and 124:
4.9. METODE ALTERNATIVE 331 supunem
Page 125 and 126:
4.9. METODE ALTERNATIVE 333 Demonst
Page 127 and 128:
4.9. METODE ALTERNATIVE 335 BISECT
Page 129 and 130:
4.9. METODE ALTERNATIVE 337 operaţ
Page 131 and 132:
4.9. METODE ALTERNATIVE 339 ❅ ❅
Page 133 and 134:
4.9. METODE ALTERNATIVE 341 1. Dac
Page 135 and 136:
4.10. CONDIŢIONARE 343 ne propunem
Page 137 and 138:
4.10. CONDIŢIONARE 345 constată i
Page 139 and 140:
4.10. CONDIŢIONARE 347 condiţion
Page 141 and 142:
4.10. CONDIŢIONARE 349 Pentru p =
Page 143 and 144:
4.10. CONDIŢIONARE 351 F = A+E, cu
Page 145 and 146:
4.10. CONDIŢIONARE 353 subspaţiul
Page 147 and 148:
4.10. CONDIŢIONARE 355 În particu
Page 149 and 150:
4.11. STABILITATE NUMERICĂ 357 de
Page 151 and 152:
4.12. RUTINE LAPACK ŞI MATLAB 359
Page 153 and 154:
4.13. PROBLEME 361 P 4.8 Fie λ 1,
Page 155 and 156:
4.13. PROBLEME 363 P 4.25 Demonstra
Page 157 and 158:
4.13. PROBLEME 365 P 4.43 Fie matri
Page 159 and 160:
4.13. PROBLEME 367 P 4.59 Adaptaţi
Page 161 and 162:
Capitolul 5 Descompunerea valorilor
Page 163 and 164:
5.1. FORMULAREA PROBLEMEI 371 Demon
Page 165 and 166:
5.1. FORMULAREA PROBLEMEI 373 ✻x
Page 167 and 168:
5.1. FORMULAREA PROBLEMEI 375 Prin
Page 169 and 170:
5.1. FORMULAREA PROBLEMEI 377 unde
Page 171 and 172:
5.1. FORMULAREA PROBLEMEI 379 În s
Page 173 and 174:
5.1. FORMULAREA PROBLEMEI 381 rela
Page 175 and 176:
5.2. PROBLEME DE CALCUL CONEXE 383
Page 177 and 178:
Page 179 and 180:
Page 181 and 182:
Page 183 and 184:
Page 185 and 186:
5.3. ALGORITMUL DVS 393 5.3 Algorit
Page 187 and 188:
5.3. ALGORITMUL DVS 395 utilizaţi
Page 189 and 190:
5.3. ALGORITMUL DVS 397 Comentarii.
Page 191 and 192:
5.3. ALGORITMUL DVS 399 condiţia d
Page 193 and 194:
5.3. ALGORITMUL DVS 401 ⎡ J ← U
Page 195 and 196:
5.3. ALGORITMUL DVS 403 Având în
Page 197 and 198:
5.3. ALGORITMUL DVS 405 suprascrier
Page 199 and 200:
5.3. ALGORITMUL DVS 407 5. Dupăîn
Page 201 and 202:
5.3. ALGORITMUL DVS 409 5. Dacă op
Page 203 and 204:
5.4. CONDIŢIONARE 411 opt 1 opt 2
Page 205 and 206:
5.4. CONDIŢIONARE 413 Demonstraţi
Page 207 and 208:
5.5. STABILITATEA ALGORITMULUI DVS
Page 209 and 210:
5.6. APLICAŢIILE DVS 417 problema
Page 211 and 212:
5.6. APLICAŢIILE DVS 419 urmare,
Page 213 and 214:
5.6. APLICAŢIILE DVS 421 şi de un
Page 215 and 216:
5.6. APLICAŢIILE DVS 423 x, i.e. (
Page 217 and 218:
5.6. APLICAŢIILE DVS 425 [ (A(i,:)
Page 219 and 220:
5.6. APLICAŢIILE DVS 427 minimul a
Page 221 and 222:
5.6. APLICAŢIILE DVS 429 5.6.4 Pro
Page 223 and 224:
5.6. APLICAŢIILE DVS 431 Problema
Page 225 and 226:
5.6. APLICAŢIILE DVS 433 Prin urma
Page 227 and 228:
5.6. APLICAŢIILE DVS 435 se obţin
Page 229 and 230:
5.6. APLICAŢIILE DVS 437 7. x ∗
Page 231 and 232:
5.6. APLICAŢIILE DVS 439 2. Se cal
Page 233 and 234:
5.8. PROBLEME 441 Dar ale matricei
Page 235 and 236:
5.8. PROBLEME 443 are o soluţie un
Page 237 and 238:
Capitolul 6 Calculul valorilor şi
Page 239 and 240:
6.1. FORMULAREA PROBLEMEI 447 ( [ ]
Page 241 and 242:
6.1. FORMULAREA PROBLEMEI 449 Propr
Page 243 and 244:
6.2. FORMA SCHUR GENERALIZATĂ 451
Page 245 and 246:
6.2. FORMA SCHUR GENERALIZATĂ 453
Page 247 and 248:
6.3. ALGORITMUL QZ 455 6.3 Algoritm
Page 249 and 250:
6.3. ALGORITMUL QZ 457 ⎡ (A,B)
Page 251 and 252:
6.3. ALGORITMUL QZ 459 În cazul re
Page 253 and 254:
6.3. ALGORITMUL QZ 461 i.e. acumula
Page 255 and 256:
6.3. ALGORITMUL QZ 463 (H,T)←((Q
Page 257 and 258:
6.3. ALGORITMUL QZ 465 5. Dacă opt
Page 259 and 260:
6.3. ALGORITMUL QZ 467 construcţia
Page 261 and 262:
6.3. ALGORITMUL QZ 469 Această sch
Page 263 and 264:
6.3. ALGORITMUL QZ 471 5. Pentru k
Page 265 and 266:
6.3. ALGORITMUL QZ 473 2. % Determi
Page 267 and 268:
6.3. ALGORITMUL QZ 475 2. Se determ
Page 269 and 270:
6.3. ALGORITMUL QZ 477 actuală. Pe
Page 271 and 272:
6.3. ALGORITMUL QZ 479 (H,T)←(HZ
Page 273 and 274:
6.3. ALGORITMUL QZ 481 6. H(:,n−2
Page 275 and 276: 6.3. ALGORITMUL QZ 483 Algoritmul 6
Page 277 and 278: 6.3. ALGORITMUL QZ 485 perechea (S,
Page 279 and 280: 6.4. CALCULUL SUBSPAŢIILOR DE DEFL
Page 289 and 290: 6.6. STABILITATEA ALGORITMULUI QZ 4
Page 291 and 292: 6.8. PROBLEME 499 cu α, β paramet
Page 293 and 294: Indicaţii, răspunsuri, soluţii C
Page 295 and 296: INDICAŢII, RĂSPUNSURI, SOLUŢII 5
Page 325: Bibliografie [1] J.O. Aasen. On the
Page 329 and 330: Index acurateţe, 13 algoritmi la n
Page 331 and 332: INDEX 539 hermitică, 49, 215 Hesse
Page 333: INDEX 541 a algoritmului QR, 356 a
show all

Calculul valorilor si vectorilor proprii

Create successful ePaper yourself

Delete template?

Save as template?