Various types of nonsmooth invex functions
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Publication:4718649
DOI10.1080/02522667.1996.10699267zbMath0859.49020OpenAlexW2080268978MaRDI QIDQ4718649
Giorgio Giorgi, Angelo Guerraggio
Publication date: 6 April 1997
Published in: Journal of Information and Optimization Sciences (Search for Journal in Brave)
Full work available at URL: https://doi.org/10.1080/02522667.1996.10699267
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Some sufficient efficiency conditions in semiinfinite multiobjective fractional programming based on exponential type invexities ⋮ Nonsmooth vector-valued invex functions and applications ⋮ Duality in Vector Optimization Under Type 1 α-Invexity in Banach Spaces ⋮ Generalized \((\eta,\rho)\)-invex functions and global semiparametric sufficient efficiency conditions for multiobjective fractional programming problems containing arbitrary norms ⋮ Generalized \((\eta,\rho)\)-invex functions and semiparametric duality models for multiobjective fractional programming problems containing arbitrary norms ⋮ Global parametric sufficient optimality conditions for discrete minmax fractional programming problems containing generalized \((\theta,\eta,\rho)\)-V-invex functions and arbitrary norms ⋮ Global parametric sufficient efficiency conditions for semiinfinite multiobjective fractional programming problems containing generalized \((\alpha,\eta,\rho)\)-V-invex functions ⋮ Characterization of solution sets of quasiconvex programs ⋮ Vector variational-like inequalities with generalized bifunctions defined on nonconvex sets ⋮ Generalized (F,β,Φ,ρ,θ) -univex functions and optimality conditions in semiinfinite fractional programming ⋮ Some relations between variational-like inequalities and efficient solutions of certain nonsmooth optimization problems ⋮ Semiparametric sufficient efficiency conditions for multiobjective fractional programming problems containing arbitrary norms ⋮ Nonsmooth invex functions and sufficient optimality conditions ⋮ Another approach to multiobjective programming problems with \(F\)-convex functions ⋮ Vector variational-like inequalities and non-smooth vector optimization problems ⋮ On duality theorems for nonsmooth Lipschitz optimization problems ⋮ ρ-Invex Functions and ( F , ρ)Convex Functions: Properties and Equivalences ⋮ Existence of solutions for vector optimization problems ⋮ Nonsmooth continuous-time optimization problems: Sufficient conditions ⋮ Global parametric sufficient optimality conditions for semi-infinite discrete minmax fractional programming problems involving generalized \((\eta ,\rho )\)-invex functions ⋮ Nondifferentiable multiobjective programming under generalized \(d_I\)-invexity ⋮ Efficiency conditions and duality models for multiobjective fractional subset programming problems with generalized \(({\mathcal F},\alpha,\rho,\theta)\)-\(V\)-convex functions
Cites Work
- Unnamed Item
- Symmetric duality with invexity in variational problems
- Nondifferentiable optimization: motivations and applications. Proceedings of an IIASA (International Institute for Applied Systems Analysis) Workshop on Nondifferentiable Optimization Held at Sopron, Hungary, September 17-22, 1984
- Duality and sufficiency in control problems with invexity
- On sufficiency of the Kuhn-Tucker conditions
- \(D\)-invexity and optimality conditions
- Foundations of optimization
- On functions whose stationary points are global minima
- Note on generalized convex functions
- Necessary and Sufficient Conditions for a Local Minimum. 1: A Reduction Theorem and First Order Conditions
- Nonsmooth invexity
- Optimization and nonsmooth analysis
- What is invexity?
- On optimality conditions in nonsmooth inequality constrained minimization
- Generalized Directional Derivatives and Subgradients of Nonconvex Functions
- Invex functions and constrained local minima
- A New Approach to Lagrange Multipliers
- Sufficient optimality criteria and duality for variational problems with generalised invexity
- Sufficient conditions for extremum, penalty functions and regularity
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