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contributor authorHan Tong Loh
contributor authorP. Y. Papalambros
date accessioned2017-05-08T23:36:08Z
date available2017-05-08T23:36:08Z
date copyrightSeptember, 1991
date issued1991
identifier issn1050-0472
identifier otherJMDEDB-27589#325_1.pdf
identifier urihttp://yetl.yabesh.ir/yetl/handle/yetl/108918
description abstractDesign optimization models of often contain variables that must take only discrete values, such as standard sizes. Nonlinear optimization problems with a mixture of discrete and continuous variables are very difficult, and existing algorithms are either computationally intensive or applicable to models with special structure. A new approach for solving nonlinear mixed-discrete problems with no particular structure is presented here, motivated by its efficiency for models with extensive monotonicities of the problem’s objective and constraint functions with respect to the design variables. It involves solving a sequence of mixed-discrete linear approximations of the original nonlinear model. In this article, a review of previous approaches is followed by description of the resulting algorithm, its convergence properties and limitations. Several illustrative examples are given. A sequel article presents a detailed algorithmic implementation and extensive computational results.
publisherThe American Society of Mechanical Engineers (ASME)
titleA Sequential Linearization Approach for Solving Mixed-Discrete Nonlinear Design Optimization Problems
typeJournal Paper
journal volume113
journal issue3
journal titleJournal of Mechanical Design
identifier doi10.1115/1.2912786
journal fristpage325
journal lastpage334
identifier eissn1528-9001
keywordsDesign
keywordsOptimization
keywordsAlgorithms
keywordsApproximation
keywordsFunctions AND Mixtures
treeJournal of Mechanical Design:;1991:;volume( 113 ):;issue: 003
contenttypeFulltext


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