The use of negative curvature in minimization algorithms:
IN this paper we examine existiing algorithms for minimizing a nonlinear function of many variables which make use of negative curvature. These algorithms can all be viewed as modified versions of Newton's method and their merits and drawbacks are discussed to help identify new and more promisi...
Gespeichert in:
| 1. Verfasser: | |
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| Format: | Buch |
| Sprache: | English |
| Veröffentlicht: |
Ithaca, New York
1980
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| Schriftenreihe: | Cornell University <Ithaca, NY> / Department of Computer Science: Technical report
412 |
| Schlagworte: | |
| Zusammenfassung: | IN this paper we examine existiing algorithms for minimizing a nonlinear function of many variables which make use of negative curvature. These algorithms can all be viewed as modified versions of Newton's method and their merits and drawbacks are discussed to help identify new and more promising methods. The algorithms considered include ones which compute and search along nonascent directions of negative curvature and ones which search along curvi-linear paths generated by these directions and descent directions. Versions of the Goldfield-Quandt-Trotter method, or equivalently, methods based upon a trust region strategy, and gradient path methods are also considered. When combined with the numerically stable Bunch-Parlett factorization of a symmetric indefinite matrix the latter two approaches give rise to new, and what appears to be, efficient and robust minimization methods which can take advantage of negative curvature when it is encountered. Several suggestions are made for further research in this area. |
| Beschreibung: | 25 Sp. |
Internformat
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| 490 | 1 | |a Cornell University <Ithaca, NY> / Department of Computer Science: Technical report |v 412 | |
| 520 | 3 | |a IN this paper we examine existiing algorithms for minimizing a nonlinear function of many variables which make use of negative curvature. These algorithms can all be viewed as modified versions of Newton's method and their merits and drawbacks are discussed to help identify new and more promising methods. The algorithms considered include ones which compute and search along nonascent directions of negative curvature and ones which search along curvi-linear paths generated by these directions and descent directions. Versions of the Goldfield-Quandt-Trotter method, or equivalently, methods based upon a trust region strategy, and gradient path methods are also considered. When combined with the numerically stable Bunch-Parlett factorization of a symmetric indefinite matrix the latter two approaches give rise to new, and what appears to be, efficient and robust minimization methods which can take advantage of negative curvature when it is encountered. Several suggestions are made for further research in this area. | |
| 650 | 4 | |a Curvature | |
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| id | DE-604.BV010009811 |
| illustrated | Not Illustrated |
| indexdate | 2024-07-09T17:44:53Z |
| institution | BVB |
| language | English |
| oai_aleph_id | oai:aleph.bib-bvb.de:BVB01-006636796 |
| oclc_num | 63631528 |
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| physical | 25 Sp. |
| publishDate | 1980 |
| publishDateSearch | 1980 |
| publishDateSort | 1980 |
| record_format | marc |
| series2 | Cornell University <Ithaca, NY> / Department of Computer Science: Technical report |
| spelling | Goldfarb, Donald Verfasser aut The use of negative curvature in minimization algorithms Ithaca, New York 1980 25 Sp. txt rdacontent n rdamedia nc rdacarrier Cornell University <Ithaca, NY> / Department of Computer Science: Technical report 412 IN this paper we examine existiing algorithms for minimizing a nonlinear function of many variables which make use of negative curvature. These algorithms can all be viewed as modified versions of Newton's method and their merits and drawbacks are discussed to help identify new and more promising methods. The algorithms considered include ones which compute and search along nonascent directions of negative curvature and ones which search along curvi-linear paths generated by these directions and descent directions. Versions of the Goldfield-Quandt-Trotter method, or equivalently, methods based upon a trust region strategy, and gradient path methods are also considered. When combined with the numerically stable Bunch-Parlett factorization of a symmetric indefinite matrix the latter two approaches give rise to new, and what appears to be, efficient and robust minimization methods which can take advantage of negative curvature when it is encountered. Several suggestions are made for further research in this area. Curvature Nonlinear theories Department of Computer Science: Technical report Cornell University <Ithaca, NY> 412 (DE-604)BV006185504 412 |
| spellingShingle | Goldfarb, Donald The use of negative curvature in minimization algorithms Curvature Nonlinear theories |
| title | The use of negative curvature in minimization algorithms |
| title_auth | The use of negative curvature in minimization algorithms |
| title_exact_search | The use of negative curvature in minimization algorithms |
| title_full | The use of negative curvature in minimization algorithms |
| title_fullStr | The use of negative curvature in minimization algorithms |
| title_full_unstemmed | The use of negative curvature in minimization algorithms |
| title_short | The use of negative curvature in minimization algorithms |
| title_sort | the use of negative curvature in minimization algorithms |
| topic | Curvature Nonlinear theories |
| topic_facet | Curvature Nonlinear theories |
| volume_link | (DE-604)BV006185504 |
| work_keys_str_mv | AT goldfarbdonald theuseofnegativecurvatureinminimizationalgorithms |