Item Infomation
Title: | Approximate Jacobian matrices for nonsmooth continuous maps and C¹-optimization |
Authors: | V. Jeyakumar |
Keywords: | Generalized Jacobians; Nonsmooth analysis; Mean value conditions |
Issue Date: | 1998 |
Publisher: | Society for Industrial and Applied Mathematics |
Series/Report no.: | ;Vol. 36, No. 5 |
Abstract: | The notion of approximate Jacobian matrices is introduced for a continuous vector valued map. It is shown, for instance, that the Clarke generalized Jacobian is an approximate Jacobian for a locally Lipschitz map. The approach is based on the idea of convexificators of real valued functions. Mean value conditions for continuous vector-valued maps and Taylor’s expansions for continuously Gˆateaux differentiable functions (i.e., C1-functions) are presented in terms of ap proximate Jacobians and approximate Hessians, respectively. Second-order necessary and sufficient conditions for optimality and convexity of C1-functions are also given |
URI: | http://thuvienso.thanglong.edu.vn//handle/TLU/8278 |
Appears in Collections | Lĩnh vực Toán ứng dụng |
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