Duality Theory in Generalized ? -Univex Fractional Semi-infinite Programming

Author

Yang, Yong ; Zhang, Qing Xiang

Author_Institution

Fac. of Sci., Shaanxi Univ. of Sci. & Technol., Xi´´an, China

Volume

2

fYear

2009

fDate

24-26 April 2009

Firstpage

757

Lastpage

760

Abstract

The Mond-Weir type duality for a class of nonsmooth nonconvex fractional semi-infinite programming are studied. Under the generalized rho-univexity hypotheses, some weak and strong duality theorems are established, which provide a measurement of sensitivity for given problems to perturbations. The results can be applied to fractional program problems arising from portfolio selection, agricultural panning, information transfer, cargo loading problems, stochastic processes and numerical analysis, etc.

Keywords

concave programming; duality (mathematics); Mond-Weir type duality; agricultural panning; cargo loading problem; duality theory; generalized rho-univex fractional semiinfinite programming; information transfer; nonsmooth nonconvex fractional semiinfinite programming; numerical analysis; portfolio selection; stochastic processes; Computer science; Educational institutions; Functional programming; Mathematics; Numerical analysis; Portfolios; Stochastic processes; TV; Fractional Semi-Infinite Programming; Generalized ? -univexity; duality theory;

fLanguage

English

Publisher

ieee

Conference_Titel

Computational Sciences and Optimization, 2009. CSO 2009. International Joint Conference on

Conference_Location

Sanya, Hainan

Print_ISBN

978-0-7695-3605-7

Type

conf

DOI

10.1109/CSO.2009.241

Filename

5194058