Generalized Convexity and Vector Optimization /
Mishra, Shashi Kant.
Generalized Convexity and Vector Optimization / by Shashi Kant Mishra, Shou-Yang Wang, Kin Keung Lai. - recurso en línea. - Nonconvex Optimization and Its Applications, 90 1571-568X ; .
Springer eBooks
Generalized Convex Functions -- Generalized Type I and Related Functions -- Optimality Conditions -- Duality Theory -- Second and Higher Order Duality -- Symmetric Duality -- Vector Variational-like Inequality Problems.
The present book discusses the Kuhn-Tucker Optimality, Karush-Kuhn-Tucker Necessary and Sufficient Optimality Conditions in presence of various types of generalized convexity assumptions. Wolfe-type Duality, Mond-Weir type Duality, Mixed type Duality for Multiobjective optimization problems such as Nonlinear programming problems, Fractional programming problems, Nonsmooth programming problems, Nondifferentiable programming problems, Variational and Control problems under various types of generalized convexity assumptions.
9783540856719
10.1007/9783540856719 doi
QA315-316
Generalized Convexity and Vector Optimization / by Shashi Kant Mishra, Shou-Yang Wang, Kin Keung Lai. - recurso en línea. - Nonconvex Optimization and Its Applications, 90 1571-568X ; .
Springer eBooks
Generalized Convex Functions -- Generalized Type I and Related Functions -- Optimality Conditions -- Duality Theory -- Second and Higher Order Duality -- Symmetric Duality -- Vector Variational-like Inequality Problems.
The present book discusses the Kuhn-Tucker Optimality, Karush-Kuhn-Tucker Necessary and Sufficient Optimality Conditions in presence of various types of generalized convexity assumptions. Wolfe-type Duality, Mond-Weir type Duality, Mixed type Duality for Multiobjective optimization problems such as Nonlinear programming problems, Fractional programming problems, Nonsmooth programming problems, Nondifferentiable programming problems, Variational and Control problems under various types of generalized convexity assumptions.
9783540856719
10.1007/9783540856719 doi
QA315-316