Iterative methods for linear and nonlinear equations
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| 003 | CHVBK | ||
| 005 | 20201204103307.0 | ||
| 008 | 130816s1995 xxu | 00 |eng|d | ||
| 010 | |a 95032249 | ||
| 020 | |a 0-89871-352-8 | ||
| 035 | |a (NEBIS)001507369 | ||
| 035 | |a (SBT)000591137 | ||
| 035 | |a (RERO)2232176 | ||
| 040 | |a ETH-BIB |b ger |c ETH-BIB |e ETHICS-ISBD | ||
| 072 | 7 | |a s1ma |2 rero | |
| 245 | 0 | 0 | |a Iterative methods for linear and nonlinear equations |c C. T. Kelley |
| 260 | |a Philadelphia |b Society for Industrial and Applied Mathematics, SIAM |c 1995 | ||
| 300 | |a XIII, 166 S. |c 26 cm | ||
| 490 | 1 | |a Frontiers in applied mathematics |v vol. 16 |i 16 |w (NEBIS)000996855 |9 13422650X | |
| 504 | |a p. 153-162 | ||
| 520 | |a Linear and nonlinear systems of equations are the basis for many, if not most, of the models of phenomena in science and engineering, and their efficient numerical solution is critical to progress in these areas. This is the first book to be published on nonlinear equations since the mid-1980s. Although it stresses recent developments in this area, such as Newton-Krylov methods, considerable material on linear equations has been incorporated. This book focuses on a small number of methods and treats them in depth. The author provides a complete analysis of the conjugate gradient and generalized minimum residual iterations as well as recent advances including Newton-Krylov methods, incorporation of inexactness and noise into the analysis, new proofs and implementations of Broyden's method, and globalization of inexact Newton methods. | ||
| 650 | 7 | |a ITERATIVE VERFAHREN (NUMERISCHE MATHEMATIK) |x ger |0 (ETHUDK)000054042 |2 ethudk | |
| 650 | 7 | |a KRYLOV-SUBSPACE-METHODE (NUMERISCHE MATHEMATIK) |x ger |0 (ETHUDK)000051308 |2 ethudk | |
| 650 | 7 | |a LINEARE GLEICHUNGSSYSTEME (NUMERISCHE MATHEMATIK) |x ger |0 (ETHUDK)000013642 |2 ethudk | |
| 650 | 7 | |a MATLAB (SOFTWARE FÜR NUMERISCHE BERECHNUNG) |x ger |0 (ETHUDK)000052073 |2 ethudk | |
| 650 | 7 | |a METHODE DER KONJUGIERTEN GRADIENTEN (NUMERISCHE MATHEMATIK) |x ger |0 (ETHUDK)000044724 |2 ethudk | |
| 650 | 7 | |a NICHTLINEARE GLEICHUNGEN UND GLEICHUNGSSYSTEME (NUMERISCHE MATHEMATIK) |x ger |0 (ETHUDK)000013648 |2 ethudk | |
| 650 | 7 | |a Itération (mathématiques) |0 (RERO)A021011215 |2 rero | |
| 690 | 7 | |B u |a 65-02 |d Research expositions (monographs, survey articles) |2 idsuzh UT | |
| 690 | 7 | |B u |a 65Fxx |d Numerical linear algebra |2 idsuzh UT | |
| 690 | 7 | |B u |a 65Hxx |d Nonlinear algebraic or transcendental equations |2 idsuzh UT | |
| 691 | 7 | |B u |a LINEARE GLEICHUNGSSYSTEME (NUMERISCHE MATHEMATIK) |z ger |u 519.612 |2 nebis E1 | |
| 691 | 7 | |B u |a NICHTLINEARE GLEICHUNGEN UND GLEICHUNGSSYSTEME (NUMERISCHE MATHEMATIK) |z ger |u 519.615.5 |2 nebis E1 | |
| 691 | 7 | |B u |a MATLAB (SOFTWARE FÜR NUMERISCHE BERECHNUNG) |z ger |u 519.6,0 |2 nebis E1 | |
| 691 | 7 | |B u |a METHODE DER KONJUGIERTEN GRADIENTEN (NUMERISCHE MATHEMATIK) |z ger |u 519.63*8 |2 nebis E1 | |
| 691 | 7 | |B u |a KRYLOV-SUBSPACE-METHODE (NUMERISCHE MATHEMATIK) |z ger |u 519.612,2 |2 nebis E1 | |
| 691 | 7 | |B u |a ITERATIVE VERFAHREN (NUMERISCHE MATHEMATIK) |z ger |u 519.6,7 |2 nebis E1 | |
| 691 | 7 | |B u |a SYSTÈMES D'ÉQUATIONS LINÉAIRES (ANALYSE NUMÉRIQUE) |z fre |u 519.612 |2 nebis E1 | |
| 691 | 7 | |B u |a SYSTEMS OF LINEAR EQUATIONS (NUMERICAL MATHEMATICS) |z eng |u 519.612 |2 nebis E1 | |
| 691 | 7 | |B u |a NONLINEAR EQUATIONS AND EQUATION SYSTEMS (NUMERICAL MATHEMATICS) |z eng |u 519.615.5 |2 nebis E1 | |
| 691 | 7 | |B u |a ÉQUATIONS ET SYSTÈMES D'ÉQUATIONS NON LINÉAIRES (ANALYSE NUMÉRIQUE) |z fre |u 519.615.5 |2 nebis E1 | |
| 691 | 7 | |B u |a MATLAB (LOGICIEL POUR LE CALCUL NUMÉRIQUE) |z fre |u 519.6,0 |2 nebis E1 | |
| 691 | 7 | |B u |a MATLAB (SOFTWARE FOR NUMERICAL COMPUTATION) |z eng |u 519.6,0 |2 nebis E1 | |
| 691 | 7 | |B u |a MÉTHODE DU GRADIENT CONJUGUÉ (ANALYSE NUMÉRIQUE) |z fre |u 519.63*8 |2 nebis E1 | |
| 691 | 7 | |B u |a CONJUGATE GRADIENT METHOD (NUMERICAL MATHEMATICS) |z eng |u 519.63*8 |2 nebis E1 | |
| 691 | 7 | |B u |a MÉTHODE DES SOUS-ESPACES DE KRYLOV (ANALYSE NUMÉRIQUE) |z fre |u 519.612,2 |2 nebis E1 | |
| 691 | 7 | |B u |a KRYLOV SUBSPACE METHOD (NUMERICAL MATHEMATICS) |z eng |u 519.612,2 |2 nebis E1 | |
| 691 | 7 | |B u |a ITERATIVE METHODS (NUMERICAL MATHEMATICS) |z eng |u 519.6,7 |2 nebis E1 | |
| 691 | 7 | |B u |a MÉTHODES ITÉRATIVES (ANALYSE NUMÉRIQUE) |z fre |u 519.6,7 |2 nebis E1 | |
| 691 | 7 | |B u |u 518.26 |a Metodi iterativi |2 sbt TE | |
| 700 | 1 | |a Kelley |D C.T. | |
| 830 | 0 | |a Frontiers in applied mathematics |v 16 |w (RERO)000672426 | |
| 898 | |a BK020000 |b XK020000 |c XK020000 | ||
| 909 | 7 | |a E99-20110412 |2 nebis EN | |
| 912 | 7 | |a 125 |2 E01-20100101 | |
| 912 | 7 | |a ma |2 SzBzSBTc | |
| 949 | |B RERO |F RE01059 |b RE01059 |c RE010590001 |j IMATH 8-749 | ||
| 949 | |B SBT |F LUBUL |b LUBUL |c 201 |j BUL A 518.26 KEL ITE | ||
| 949 | |B NEBIS |F E64 |b E64 |c E64BI |j M 1.80 | ||
| 949 | |B NEBIS |F E72 |b E72 |c E72BI |j M7.95.2 | ||
| 949 | |B NEBIS |F E99 |b E99 |c E99BI |j 500//681 | ||
| 949 | |B NEBIS |F UFBI |b UFBI |c ULMAT |j QA297.8.K45 1995 | ||
| 949 | |B NEBIS |F E83 |b E83 |c E83CP |j INF : KEL | ||
| 949 | |B NEBIS |F E01 |b E01 |c MG |j P 716066: 16 | ||
| 949 | |B NEBIS |F E02 |b E02 |c E02RB |j 65 KEL | ||
| 950 | |B NEBIS |P 490 |E -- |a Frontiers in applied mathematics |v vol. 16 |i 16 |w (NEBIS)000996855 |9 13422650X | ||
| 950 | |B NEBIS |P 700 |E 1- |a Kelley |D C.T. | ||
| 950 | |B SBT |P 100 |E 1- |a Kelley |D C.T. | ||
| 950 | |B SBT |P 490 |E -- |a Frontiers in applied mathematics |v vol. 16 |i 16 |w (SBT)000508923 |9 283821949 | ||
| 950 | |B RERO |P 100 |E 1- |a Kelley |D C.T. |0 (IDREF)077169611 |4 cre | ||
| 950 | |B RERO |P 490 |E 1- |a Frontiers in applied mathematics |v vol. 16 | ||
| 950 | |B RERO |P 830 |E -- |a Frontiers in applied mathematics |v 16 |w (RERO)000672426 | ||
| 986 | |a SWISSBIB |b 096667761 | ||