Iterative methods for sparse linear systems
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| 100 | 1 | |a Saad |D Yousef | |
| 245 | 1 | 0 | |a Iterative methods for sparse linear systems |c Yousef Saad |
| 250 | |a 2nd ed. | ||
| 264 | 1 | |a Philadelphia |b Society for industrial and applied mathematics |c 2003 | |
| 300 | |a 528 S. |b Ill. | ||
| 504 | |a Includes bibliographical references p. 495-516) and index | ||
| 520 | |a Increased participation in world trade is conventionally seen as the key to economic growth and development. Yet, as this book shows through its detailed examination of contemporary world trade patterns, while developing country exports have grown faster than the world average, the rich countries have meanwhile increased their share in world manufacturing valued added. This poses the vitally important policy challenge of what poor countries, confronted by the vigorous expansion of their foreign trade but no comparable rise in income, should do. Primary commodity prices have collapsed in value, and there is a real danger that the terms of trade for their exports of manufactured goods may do the same. The key challenge confronting poor countries today is not more trade liberalization on their part, but how to improve the terms of their participation in world trade and to increase the still limited and unstable benefits they derive from it. | ||
| 650 | 0 | |a Sparse matrices | |
| 650 | 0 | |a Iterative methods Mathematics | |
| 650 | 0 | |a Differential equations, Partial |x Numerical solutions | |
| 650 | 7 | |a ITERATIVE VERFAHREN (NUMERISCHE MATHEMATIK) |x ger |0 (ETHUDK)000054042 |2 ethudk | |
| 650 | 7 | |a PARALLELE NUMERIK (NUMERISCHE MATHEMATIK) |x ger |0 (ETHUDK)000013641 |2 ethudk | |
| 650 | 7 | |a PARTIELLE DIFFERENTIALGLEICHUNGEN (NUMERISCHE MATHEMATIK) |x ger |0 (ETHUDK)000013656 |2 ethudk | |
| 650 | 7 | |a SCHWACHBESETZTE MATRIZEN (NUMERISCHE MATHEMATIK) |x ger |0 (ETHUDK)000013643 |2 ethudk | |
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| 691 | 7 | |B u |a SCHWACHBESETZTE MATRIZEN (NUMERISCHE MATHEMATIK) |z ger |u 519.612,1 |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 PARALLELE NUMERIK (NUMERISCHE MATHEMATIK) |z ger |u 519.6,4 |2 nebis E1 | |
| 691 | 7 | |B u |a PARTIAL DIFFERENTIAL EQUATIONS (NUMERICAL MATHEMATICS) |z eng |u 519.63 |2 nebis E1 | |
| 691 | 7 | |B u |a ÉQUATIONS AUX DÉRIVÉES PARTIELLES (ANALYSE NUMÉRIQUE) |z fre |u 519.63 |2 nebis E1 | |
| 691 | 7 | |B u |a SPARSE MATRICES (NUMERICAL MATHEMATICS) |z eng |u 519.612,1 |2 nebis E1 | |
| 691 | 7 | |B u |a MATRICES CREUSES (ANALYSE NUMÉRIQUE) |z fre |u 519.612,1 |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 | |
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| 956 | 4 | |B NEBIS |C EAD50 |D EBI01 |a E01 |u https://opac.nebis.ch/objects/pdf/000183514_e01_9780898715347_02.pdf |y Abstract / Autoreninformation |x VIEW |q pdf | |
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