Nonsmooth vector optimization problems and minty vector variational inequalities

Q. H. Ansari; G. M. Lee

doi:10.1007/s10957-009-9638-9

Nonsmooth vector optimization problems and minty vector variational inequalities

Q. H. Ansari
, G. M. Lee

Research output: Contribution to journal › Article › peer-review

41 Scopus citations

Abstract

The vector optimization problem may have a nonsmooth objective function. Therefore, we introduce the Minty vector variational inequality (Minty VVI) and the Stampacchia vector variational inequality (Stampacchia VVI) defined by means of upper Dini derivative. By using the Minty VVI, we provide a necessary and sufficient condition for a vector minimal point (v.m.p.) of a vector optimization problem for pseudoconvex functions involving Dini derivatives. We establish the relationship between the Minty VVI and the Stampacchia VVI under upper sign continuity. Some relationships among v.m.p., weak v.m.p., solutions of the Stampacchia VVI and solutions of the Minty VVI are discussed. We present also an existence result for the solutions of the weak Minty VVI and the weak Stampacchia VVI.

Original language	English
Pages (from-to)	1-16
Number of pages	16
Journal	Journal of Optimization Theory and Applications
Volume	145
Issue number	1
DOIs	https://doi.org/10.1007/s10957-009-9638-9
State	Published - Mar 2010
Externally published	Yes

Keywords

Dini derivative
Minty vector variational inequalities
Pseudoconvex functions
Stampacchia vector variational inequalities
Upper sign continuity
Vector minimal points
Vector optimization problems
Weak vector minimal points

ASJC Scopus subject areas

Control and Optimization
Management Science and Operations Research
Applied Mathematics

Access to Document

10.1007/s10957-009-9638-9

Cite this

@article{51ddf49075bb4fe497364af9d7848555,

title = "Nonsmooth vector optimization problems and minty vector variational inequalities",

abstract = "The vector optimization problem may have a nonsmooth objective function. Therefore, we introduce the Minty vector variational inequality (Minty VVI) and the Stampacchia vector variational inequality (Stampacchia VVI) defined by means of upper Dini derivative. By using the Minty VVI, we provide a necessary and sufficient condition for a vector minimal point (v.m.p.) of a vector optimization problem for pseudoconvex functions involving Dini derivatives. We establish the relationship between the Minty VVI and the Stampacchia VVI under upper sign continuity. Some relationships among v.m.p., weak v.m.p., solutions of the Stampacchia VVI and solutions of the Minty VVI are discussed. We present also an existence result for the solutions of the weak Minty VVI and the weak Stampacchia VVI.",

keywords = "Dini derivative, Minty vector variational inequalities, Pseudoconvex functions, Stampacchia vector variational inequalities, Upper sign continuity, Vector minimal points, Vector optimization problems, Weak vector minimal points",

author = "Ansari, \{Q. H.\} and Lee, \{G. M.\}",

year = "2010",

month = mar,

doi = "10.1007/s10957-009-9638-9",

language = "English",

volume = "145",

pages = "1--16",

journal = "Journal of Optimization Theory and Applications",

issn = "0022-3239",

number = "1",

}

TY - JOUR

T1 - Nonsmooth vector optimization problems and minty vector variational inequalities

AU - Ansari, Q. H.

AU - Lee, G. M.

PY - 2010/3

Y1 - 2010/3

N2 - The vector optimization problem may have a nonsmooth objective function. Therefore, we introduce the Minty vector variational inequality (Minty VVI) and the Stampacchia vector variational inequality (Stampacchia VVI) defined by means of upper Dini derivative. By using the Minty VVI, we provide a necessary and sufficient condition for a vector minimal point (v.m.p.) of a vector optimization problem for pseudoconvex functions involving Dini derivatives. We establish the relationship between the Minty VVI and the Stampacchia VVI under upper sign continuity. Some relationships among v.m.p., weak v.m.p., solutions of the Stampacchia VVI and solutions of the Minty VVI are discussed. We present also an existence result for the solutions of the weak Minty VVI and the weak Stampacchia VVI.

AB - The vector optimization problem may have a nonsmooth objective function. Therefore, we introduce the Minty vector variational inequality (Minty VVI) and the Stampacchia vector variational inequality (Stampacchia VVI) defined by means of upper Dini derivative. By using the Minty VVI, we provide a necessary and sufficient condition for a vector minimal point (v.m.p.) of a vector optimization problem for pseudoconvex functions involving Dini derivatives. We establish the relationship between the Minty VVI and the Stampacchia VVI under upper sign continuity. Some relationships among v.m.p., weak v.m.p., solutions of the Stampacchia VVI and solutions of the Minty VVI are discussed. We present also an existence result for the solutions of the weak Minty VVI and the weak Stampacchia VVI.

KW - Dini derivative

KW - Minty vector variational inequalities

KW - Pseudoconvex functions

KW - Stampacchia vector variational inequalities

KW - Upper sign continuity

KW - Vector minimal points

KW - Vector optimization problems

KW - Weak vector minimal points

UR - https://www.scopus.com/pages/publications/77949569774

U2 - 10.1007/s10957-009-9638-9

DO - 10.1007/s10957-009-9638-9

M3 - Article

AN - SCOPUS:77949569774

SN - 0022-3239

VL - 145

SP - 1

EP - 16

JO - Journal of Optimization Theory and Applications

JF - Journal of Optimization Theory and Applications

IS - 1

ER -

Nonsmooth vector optimization problems and minty vector variational inequalities

Abstract

Keywords

ASJC Scopus subject areas

Access to Document

Fingerprint

Cite this