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In this paper, a model of a linear multilevel programming problem with dominated objective functions (LMPPD(l)) is proposed, where multiple reactions of the lower levels do not lead to any uncertainty in the upper-level decision making. Under the assumption that the constrained set is nonempty and bounded, a necessary optimality condition is obtained. Two types of geometric properties of the solution sets are studied. It is demonstrated that the feasible set of LMPPD(l) is neither necessarily composed of faces of the constrained set nor necessarily connected. These properties are different from the existing theoretical results for linear multilevel programming problems.
Details
Subject
Title
Optimality Conditions and Geometric Properties of a Linear Multilevel Programming Problem with Dominated Objective Functions: [1]
Author
Volume
123
Issue
2
Pages
409-429
Publication year
2004
Publication date
Nov 2004
Place of publication
New York
Country of publication
Netherlands
Publication subject
ISSN
00223239
e-ISSN
15732878
Source type
Scholarly Journal
Language of publication
English
Document type
PERIODICAL
ProQuest document ID
196587094
Document URL
https://www.proquest.com/scholarly-journals/optimality-conditions-geometric-properties-linear/docview/196587094/se-2?accountid=208611
Copyright
Springer Science+Business Media, Inc. 2004
Last updated
2024-12-03
Database
ProQuest One Academic