Error Linearization in the Least-Squares Design of Function Generating MechanismsSource: Journal of Mechanical Design:;1982:;volume( 104 ):;issue: 004::page 881Author:D. J. Wilde
DOI: 10.1115/1.3256452Publisher: The American Society of Mechanical Engineers (ASME)
Abstract: Minimum squared error mechanism synthesis can be done relatively easily by Error Linearization, a nonlinear regression procedure long known to statisticians. It has a descent property not possessed by the Newton-Raphson method, which consequently tends more readily to converge to unwanted stationary points. Applied to a four-bar function generator, error linearization yields, for the Freudenstein linear displacement equation, a least-squares design as a direct solution of three linear equations, whatever the number of design angle pairs. For the particular example considered, this design is mechanically unacceptable, but a good configuration is produced by a more natural nonlinear model in which angular error is the measure of performance. Here error linearization avoids nonoptimal local minima to which the Newton-Raphson method converges.
keyword(s): Design , Errors , Mechanisms , Equations , Newton's method , Generators AND Displacement ,
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| contributor author | D. J. Wilde | |
| date accessioned | 2017-05-08T23:13:56Z | |
| date available | 2017-05-08T23:13:56Z | |
| date copyright | October, 1982 | |
| date issued | 1982 | |
| identifier issn | 1050-0472 | |
| identifier other | JMDEDB-28003#881_1.pdf | |
| identifier uri | http://yetl.yabesh.ir/yetl/handle/yetl/96153 | |
| description abstract | Minimum squared error mechanism synthesis can be done relatively easily by Error Linearization, a nonlinear regression procedure long known to statisticians. It has a descent property not possessed by the Newton-Raphson method, which consequently tends more readily to converge to unwanted stationary points. Applied to a four-bar function generator, error linearization yields, for the Freudenstein linear displacement equation, a least-squares design as a direct solution of three linear equations, whatever the number of design angle pairs. For the particular example considered, this design is mechanically unacceptable, but a good configuration is produced by a more natural nonlinear model in which angular error is the measure of performance. Here error linearization avoids nonoptimal local minima to which the Newton-Raphson method converges. | |
| publisher | The American Society of Mechanical Engineers (ASME) | |
| title | Error Linearization in the Least-Squares Design of Function Generating Mechanisms | |
| type | Journal Paper | |
| journal volume | 104 | |
| journal issue | 4 | |
| journal title | Journal of Mechanical Design | |
| identifier doi | 10.1115/1.3256452 | |
| journal fristpage | 881 | |
| journal lastpage | 884 | |
| identifier eissn | 1528-9001 | |
| keywords | Design | |
| keywords | Errors | |
| keywords | Mechanisms | |
| keywords | Equations | |
| keywords | Newton's method | |
| keywords | Generators AND Displacement | |
| tree | Journal of Mechanical Design:;1982:;volume( 104 ):;issue: 004 | |
| contenttype | Fulltext |