Convergence analysis of a class of penalty methods for vector optimization problems with cone constraints
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Publication:858574
DOI10.1007/s10898-004-1937-yzbMath1144.90476OpenAlexW1966236941MaRDI QIDQ858574
Xue Xiang Huang, Xiao Qi Yang, Kok Lay Teo
Publication date: 11 January 2007
Published in: Journal of Global Optimization (Search for Journal in Brave)
Full work available at URL: https://doi.org/10.1007/s10898-004-1937-y
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Related Items (4)
Stability of the set of solutions for generalized vector equilibrium problems with cone constraints ⋮ Characterizations of the nonemptiness and compactness for solution sets of convex set-valued optimization problems ⋮ Calmness and exact penalization in constrained scalar set-valued optimization ⋮ Hölder Continuity of Solutions to Parametric Vector Equilibrium Problems with Nonlinear Scalarization
Cites Work
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- An existence result for maximizations with respect to cones
- Calmness and exact penalization in vector optimization with cone constraints
- Multiobjective programming and penalty functions
- A unified approach to the existing three types of variational principles for vector valued functions
- Convergence analysis of a class of nonlinear penalization methods for constrained optimization via first-order necessary optimality conditions
- Lagrange-type functions in constrained non-convex optimization.
- Extended well-posedness properties of vector optimization problems
- Asymptotic analysis of a class of nonlinear penalty methods for constrained multiobjective optimization.
- A course on optimization and best approximation
- A Nonlinear Lagrangian Approach to Constrained Optimization Problems
- Calmness and Exact Penalization
- Optimization and nonsmooth analysis
- An Exact Penalization Viewpoint of Constrained Optimization
- OPTIMALITY CONDITIONS AND APPROXIMATE OPTIMALITY CONDITIONS IN LOCALLY LIPSCHITZ VECTOR OPTIMIZATION
- Nonlinear Lagrangian for Multiobjective Optimization and Applications to Duality and Exact Penalization
- Decreasing Functions with Applications to Penalization
- A Unified Augmented Lagrangian Approach to Duality and Exact Penalization
- Mathematical Programs with Equilibrium Constraints
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