Optimization problems under two-sided (max; min)–linear Inequalities constraints

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dc.contributor.authorGad, Mahmoud
dc.date.accessioned2017-11-02
dc.date.available2017-11-02
dc.date.issued2012
dc.description.abstractas well as numerical examples will be presented.en
dc.formattextcs
dc.format.extent10 stran
dc.identifier.eissn1803-9790
dc.identifier.issn1803-9782
dc.identifier.otherACC_2012_4_10
dc.identifier.urihttps://dspace.tul.cz/handle/15240/21142
dc.language.isoen
dc.licenseCC BY-NC 4.0
dc.publisherTechnická univerzita v Liberci, Česká republikacs
dc.relation.isbasedonBUTKOVIČ, P.; HEGEDÜS, G.: An Elimination Method for Finding All Solutions of the System of Linear Equations over an Extremal Algebra, Ekonomicko–matematicky´ ob- zor 20, 1984, pp. 203-215.
dc.relation.isbasedonBUTKOVIČ , P.: Max-linear Systems: Theory and Algorithms, Springer Monographs in Mathematics, 267 p., Springer-Verlag, London, 2010.
dc.relation.isbasedonCUNINGHAME-GREEN, R. A.: Minimax Algebra. Lecture Notes in Economics and Mathematical Systems 166, Springer-Verlag, Berlin 1979.
dc.relation.isbasedonGAD, M.: Optimization problems under one-sided (max, min)−linear inequalities con- straints (to appear).
dc.relation.isbasedonGAVALEC, M.; ZIMMERMANN, K.: Solving Systems of Two-Sided (max, min)-Linear Equations, Kybernetika 46, 2010, pp. 405-414.
dc.relation.isbasedonGAVALEC, M.; GAD, M.; ZIMMERMANN, K.: Optimization problems under
dc.relation.isbasedon(max, min)−linear equation and/or inequality constraints (to appear).
dc.relation.isbasedonKRBÁLEK, P.; POZDÍLKOVÁ , A.: Maximal solutions of two-sided linear systems in max-min algebra, Kybernetika 46, 2010, pp. 501-512.
dc.relation.isbasedonVOROBJOV, N. N.: Extremal Algebra of positive Matrices, Datenverarbeitung und Ky- bernetik 3, 1967, pp. 39-71 (in Russian).
dc.relation.isbasedonZIMMERMANN, K.: A Note on Application of Two-sided Systems of (max, min)−Linear Equations and Inequalities to Some Fuzzy Set Problems, Acta Univ. Palacki. Olomuc., Fac. rer. nat., Mathematica 50, 2, 2011, pp. 129-135.
dc.relation.isbasedonZIMMERMANN, K.; GAD, M.: Optimization Problems under (max, +)− linear Con- straints, International conference presentation of mathematics ’11 (ICPM ’11), Liberec, 11, pp. 159-165, 2011. ISBN 978-80-7372-773-4.
dc.relation.ispartofACC Journalen
dc.relation.isrefereedtrue
dc.subjectTwo-sided (max, min)−linear inequalities systemen
dc.subjectlower and upper boundsen
dc.subjectmax- min optimization problemsen
dc.titleOptimization problems under two-sided (max; min)–linear Inequalities constraintsen
dc.typeArticleen
local.accessopen
local.citation.epage94
local.citation.spage85
local.fulltextyesen
local.relation.issue4
local.relation.volume18
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