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contributor authorD. J. Wilde
date accessioned2017-05-08T23:16:12Z
date available2017-05-08T23:16:12Z
date copyrightMarch, 1983
date issued1983
identifier issn1050-0472
identifier otherJMDEDB-28031#104_1.pdf
identifier urihttp://yetl.yabesh.ir/yetl/handle/yetl/97480
description abstractError Linearization (EL), an iterative curve-fitting procedure recently proposed for designing minimum squared error four-bar function generating mechanisms, suffers from frequent instability. The cause seems to be the near singularity of a certain 3×3 matrix, which produces artificially large steps, usually toward designs with unrealistically short driver and follower. This degenerate case proves unfortunately to be the true global minimum. To bring this behavior under control, the coupler length, formerly regarded as an independent design variable, is made to depend on the driver and follower lengths. They are determined by solving a now well-conditioned 2×2 set of error linearization equations. In an example this Stabilized EL procedure (SEL) located five reasonable locally minimal designs which would have been missed by the unstabilized version.
publisherThe American Society of Mechanical Engineers (ASME)
titleDegeneracy, Singularity, and Multiplicity in Least-Squares Design of a Function-Generating Mechanism
typeJournal Paper
journal volume105
journal issue1
journal titleJournal of Mechanical Design
identifier doi10.1115/1.3267326
journal fristpage104
journal lastpage107
identifier eissn1528-9001
keywordsDesign
keywordsMechanisms
keywordsErrors
keywordsFittings AND Equations
treeJournal of Mechanical Design:;1983:;volume( 105 ):;issue: 001
contenttypeFulltext


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