Hadamard Well-posed Vector Optimization Problems
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Authors
Afsaneh Poormoezi
- Department of Mathematics, Sheikh Bahai University, Isfahan, IRAN.
Abstract
In this paper, two kinds of Hadamard well-posedness for vector-valued optimization problems are introduced. By virtue of scalarization functions, the scalarization theorems of convergence for sequences of vector-valued functions are established. Then necessary and sufficient conditions for efficient solutions are given, sufficient conditions of Hadamard well-posedness for vector optimization problems are obtained by using the scalarization theorems.
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ISRP Style
Afsaneh Poormoezi, Hadamard Well-posed Vector Optimization Problems, Journal of Mathematics and Computer Science, 9 (2014), no. 4, 291 - 299
AMA Style
Poormoezi Afsaneh, Hadamard Well-posed Vector Optimization Problems. J Math Comput SCI-JM. (2014); 9(4):291 - 299
Chicago/Turabian Style
Poormoezi, Afsaneh. "Hadamard Well-posed Vector Optimization Problems." Journal of Mathematics and Computer Science, 9, no. 4 (2014): 291 - 299
Keywords
- Vector optimization
- Variational convergence
- \(\Gamma_C\)-convergence
- Efficient solutions
- Hadamard well-posedness.
MSC
References
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