Optimality conditions in set optimization employing higher-order radial derivatives
From MaRDI portal
Publication:681038
DOI10.1007/s11766-017-3414-7zbMath1389.90293OpenAlexW2620691315MaRDI QIDQ681038
Publication date: 29 January 2018
Published in: Applied Mathematics. Series B (English Edition) (Search for Journal in Brave)
Full work available at URL: https://doi.org/10.1007/s11766-017-3414-7
optimality conditionsset-valued optimizationhigher-order radial derivativeset criterionvector criterion
Multi-objective and goal programming (90C29) Optimality conditions and duality in mathematical programming (90C46)
Related Items (1)
Cites Work
- Unnamed Item
- Unnamed Item
- Optimality conditions for set-valued optimisation problems using a modified Demyanov difference
- On approximate solutions in set-valued optimization problems
- Directional derivatives in set optimization with the set less order relation
- On optimization problems with set-valued objective maps
- Higher-order radial derivatives and optimality conditions in nonsmooth vector optimization
- Higher-order optimality conditions in set-valued optimization using Studniarski derivatives and applications to duality
- Optimality conditions for weak and firm efficiency in set-valued optimization
- From scalar to vector optimization.
- Optimality conditions for set-valued maps with set optimization
- Vector optimization. Set-valued and variational analysis.
- Set-relations and optimality conditions in set-valued maps
- \((\Lambda ,C)\)-contingent derivatives of set-valued maps
- Strict Efficiency in Set-Valued Optimization
- Set-valued derivatives of multifunctions and optimality conditions
- Radial Epiderivatives and Asymptotic Functions in Nonconvex Vector Optimization
- Optimality Conditions for Several Types of Efficient Solutions of Set-Valued Optimization Problems
- Radial epiderivatives and set-valued optimization
- Set-valued Optimization
- Strict efficiency in vector optimization
This page was built for publication: Optimality conditions in set optimization employing higher-order radial derivatives
