Variational inequality - Resultats de la cerca - Dipòsit Digital de Documents de la UAB

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Resultats globals: 5 registres trobats en 0.02 segons.
Articles, 5 registres trobats

Articles	5 registres trobats

33 p, 1.2 MB

Theoretical and numerical investigation of the D-gap function for box constrained variational inequalities / Kanzow, Christian ; Fukushima, Masao
The D-gap function, recently introduced by Peng and further studied by Yamashita et al. , allows a smooth unconstrained minimization reformulation of the general variational inequality problem. This paper is concerned with the D-gap function for variational inequality problems over a box or, equivalently, mixed complementarily problems. [...]
1998
Mathematical Programming, vol. 83 n. 1 (1998) p. 55-87

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34 p, 2.0 MB

Error bounds in mathematical programming / Pang, Jong-Shi
Originated from the practical implementation and numerical considerations of iterative methods for solving mathematical programs, the study of error bounds has grown and proliferated in many interesting areas within mathematical programming. [...]
1997
Mathematical Programming, vol. 79 n. 1-3 (1997) p. 299-332

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9 p, 401.4 KB

Equivalence of variational inequality problems to unconstrained minimization / Peng, Ji-Ming
In this paper we propose a class of merit functions for variational inequality problems (VI). Through these merit functions, the variational inequality problem is cast as unconstrained minimization problem. [...]
1997
Mathematical Programming, vol. 78 n. 3 (1997) p. 347-355

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10 p, 444.6 KB

Pseudomonotone variational inequality problems : Existence of solutions / Crouzeix, Jean-Pierre
Necessary and sufficient conditions for the set of solutions of a pseudomonotone variational inequality problem to be nonempty and compact are given. .
1997
Mathematical Programming, vol. 78 n. 3 (1997) p. 305-314

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16 p, 974.1 KB

Implementation of a continuation method for normal maps / Sellami, Hichem ; Robinson, Stephen M.
This paper presents an implementation of a nonsmooth continuation method of which the idea was originally put forward by Alexander et al. We show how the method can be computationally implemented and present numerical results for variational inequality problems in up to 96 variables. [...]
1997
Mathematical Programming, vol. 76 n. 3 (1997) p. 563-578

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