Editor: Manuel A. Jiménez

Optimality Conditions in Vector Optimization

eBook: US $59 Special Offer (PDF + Printed Copy): US $143
Printed Copy: US $114
Library License: US $236
ISBN: 978-1-60805-368-1 (Print)
ISBN: 978-1-60805-110-6 (Online)
Year of Publication: 2010
DOI: 10.2174/97816080511061100101

Introduction

Vector optimization is continuously needed in several science fields, particularly in economy, business, engineering, physics and mathematics. The evolution of these fields depends, in part, on the improvements in vector optimization in mathematical programming. The aim of this Ebook is to present the latest developments in vector optimization. The contributions have been written by some of the most eminent researchers in this field of mathematical programming. The Ebook is considered essential for researchers and students in this field.

Foreword

- Pp. i-ii (2)
Fernando Lobo Pereira
Download Free

Preface

- Pp. iii
Manuel Arana Jim´enez, Gabriel x Gabriel Ruiz Garz´on, Antonio Rufi´an Lizana
Download Free

Contributors

- Pp. iv-v (2)
Manuel Arana Jim´enez, Gabriel x Gabriel Ruiz Garz´on, Antonio Rufi´an Lizana
View Abstract

Pseudoinvexity: A Good Condition for Efficiency and Weak Efficiency in Multiobjective Mathematical Programming. Characterization.

- Pp. 1-16 (16)
M. Arana-Jim´enez, G. Ruiz-Garz´on, A. Rufi´an-Lizana
View Abstract

Optimality and Constraint Qualifications in Vector Optimization

- Pp. 17-34 (18)
Carosi Laura, Martein Laura
View Abstract

Second Order Optimality Conditions in Vector Optimization Problems.

- Pp. 35-60 (26)
M. Hachimi, B. Aghezzaf
View Abstract

Invex Functions and Existence of Weakly Efficient Solutions for Nonsmooth Vector Optimization

- Pp. 61-74 (14)
Lucelina Batista Santos, Marko Rojas-Medar, Gabriel Ruiz-Garz´on, Antonio Rufi´an-Lizana
View Abstract

Proper Efficiency And Duality For Differentiable Multiobjective Programming Problems With B-(P,R)-Invex Functions

- Pp. 75-96 (22)
Tadeusz Antczak
View Abstract

On Nonsmooth Constrained Optimization Involving Generalized Type-I Conditions.

- Pp. 97-104 (8)
S. K. Mishra, J. S. Rautelay, Sanjay Oli
View Abstract

Duality Theory for the Multiobjective Nonlinear Programming Involving Generalized Convex Functions

- Pp. 105-118 (14)
R. Osuna-Gomezy, M. B. Hernnandez-Jimenez, L. L. Salles Neto
View Abstract

Mixed Type Duality for Multiobjective Optimization Problems with Set Constraints

- Pp. 119-142 (24)
Riccardo Cambini and Laura Carosi
View Abstract

Necessary and Sufficient Optimality Conditions for Continuous-Time Multiobjective Optimization Problems

- Pp. 143-163 (21)
Adilson J. V. Brand~ao, Valeriano Antunes de Oliveira, Marko Antonio Rojas-Medarx, Lucelina Batista Santos
View Abstract

Optimality Conditions and Duality for Nonsmooth Multiobjective Continuous-Time Problems

- Pp. 164-182 (19)
S. Nobakhtian, M. R. Pouryayevali
View Abstract

Index

- Pp. 183-184 (2)
Manuel Arana Jimenez, Gabriel Ruiz Garzon, Antonio Rufian Lizana
View Abstract

RELATED BOOKS

.Boundary Element Methods for Heat Transfer with Phase Change Problems: Theory and Application.
.An Introduction to Sobolev Spaces.
.Exterior Calculus: Theory and Cases.
.Trefftz and Fundamental Solution-Based Finite Element Methods.