A new minimum curvator multi-step method for unconstrained optimization
Multistep quasi-Newton methods for optimization were derived by J. A. Ford and I. A. Moghrabi [J. Comput. Appl. Math. 50, No. 1-3, 305-323 (1994; Zbl 0807.65062)], where it was shown how an interpolation in the variable-space could be used to generate “better” Hessian approximations. The work presen...
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| Format: | conferenceObject |
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1998
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| Online Access: | http://hdl.handle.net/10725/8066 http://libraries.lau.edu.lb/research/laur/terms-of-use/articles.php https://books.google.com.lb/books?hl=en&lr=&id=GyWhTtLf4-wC&oi=fnd&pg=PA319&dq=A+new+minimum+curvator+multi-step+method+for+unconstrained+optimization&ots=id6W8WnguM&sig=1Oxmn4g5PaYGfxcg5VLnsW8Di00&redir_esc=y#v=onepage&q=A%20new%20minimum%20curvator%20multi-step%20method%20for%20unconstrained%20optimization&f=false |
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http://hdl.handle.net/10725/8066http://libraries.lau.edu.lb/research/laur/terms-of-use/articles.php
https://books.google.com.lb/books?hl=en&lr=&id=GyWhTtLf4-wC&oi=fnd&pg=PA319&dq=A+new+minimum+curvator+multi-step+method+for+unconstrained+optimization&ots=id6W8WnguM&sig=1Oxmn4g5PaYGfxcg5VLnsW8Di00&redir_esc=y#v=onepage&q=A%20new%20minimum%20curvator%20multi-step%20method%20for%20unconstrained%20optimization&f=false