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The evolution of optimality: De novo programming

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dc.title The evolution of optimality: De novo programming en
dc.contributor.author Zelený, Milan
dc.relation.ispartof Evolutionary Multi-Criterion Optimization
dc.identifier.issn 0302-9743 Scopus Sources, Sherpa/RoMEO, JCR
dc.identifier.isbn 3-540-24983-4
dc.date.issued 2005
utb.relation.volume 3410
dc.citation.spage 1
dc.citation.epage 13
dc.event.title 3rd International Conference on Evolutionary Multi-Criterion Optimization (EMO 2005)
dc.event.location Guanajuato
utb.event.state-en Mexico
utb.event.state-cs Mexiko
dc.event.sdate 2005-03-09
dc.event.edate 2005-03-11
dc.type article
dc.type conferenceObject
dc.language.iso en
dc.publisher Springer-Verlag Berlin en
dc.identifier.doi 10.1007/978-3-540-31880-4_1
dc.relation.uri http://www.springerlink.com/content/6474tbnlnrtqh27c/
dc.description.abstract Evolutionary algorithms have been quite effective in dealing with single-objective "optimization" while the area of Evolutionary Multiobjective Optimization (EMOO) has extended its efficiency to Multiple Criteria Decision Making (MCDM) as well. The number of technical publications in EMOO is impressive and indicative of a rather explosive growth in recent years. It is fair to say however that most of the progress has been in applying and evolving algorithms and their convergence properties, not in evolving the optimality concept itself, nor in expanding the notions of true optimization. Yet, the conceptual constructs based on evolution and Darwinian selection have probably most to contribute at least in theory - to the evolution of optimality. They should be least dependent on a priori fixation of anything in problem formulation: constraints, objectives or alternatives. Modern systems and problems are typical for their flexibility, not for their fixation. In this paper we draw attention to the impossibility of optimization when crucial variables are given and present Eight basic concepts of optimality. In the second part of this contribution we choose a more realistic problem of linear programming where constraints are not "given" but flexible and to be optimized and objective functions are multiple: De novo programming. en
utb.faculty Faculty of Management and Economics
dc.identifier.uri http://hdl.handle.net/10563/1001977
utb.identifier.obdid 13553445
utb.identifier.scopus 2-s2.0-24344459872
utb.identifier.wok 000229021300001
utb.source d-wok
dc.date.accessioned 2011-08-09T07:34:21Z
dc.date.available 2011-08-09T07:34:21Z
utb.contributor.internalauthor Zelený, Milan
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