2016
DOI: 10.1115/1.4033251
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The Complete Solution of Alt–Burmester Synthesis Problems for Four-Bar Linkages

Abstract: Precision-point synthesis problems for design of four-bar linkages have typically been formulated using two approaches. The exclusive use of path-points is known as “path synthesis,” whereas the use of poses, i.e., path-points with orientation, is called “rigid-body guidance” or the “Burmester problem.” We consider the family of “Alt–Burmester” synthesis problems, in which some combination of path-points and poses is specified, with the extreme cases corresponding to the classical problems. The Alt–Burmester p… Show more

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Cited by 34 publications
(26 citation statements)
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“…, 6 for various primes as reported in Section 5. In particular, since the values of g i (X, C 8 ) match the results in Table 2, we have utilized symbolic methods to confirm numerical homotopy continuation computations in [12,40].…”
Section: Resultsmentioning
confidence: 90%
See 2 more Smart Citations
“…, 6 for various primes as reported in Section 5. In particular, since the values of g i (X, C 8 ) match the results in Table 2, we have utilized symbolic methods to confirm numerical homotopy continuation computations in [12,40].…”
Section: Resultsmentioning
confidence: 90%
“…In particular, they showed that there are 1442 distinct four-bar coupler curves which pass through nine general points which, together with Roberts cognates [35], yields 4326 distinct four-bar linkages. Although this computation has been repeatedly confirmed using various homotopy continuation methods, e.g., [5,12,21,22,34,38], these numerical computations do not preclude the existence of additional solutions. In fact, one of the distinct four-bar linkages was missed by the homotopy continuation solver in [40] but was reconstructed using the cognate formula.…”
Section: Introductionmentioning
confidence: 76%
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“…Alt [1] proposed synthesis problems based on path generation, specifying positions along a curve. The synthesis problem consisting of some poses and some positions was called an Alt-Burmester problem in [35] with the complete solution to all Alt-Burmester problems described in [6]. We compute the Galois group for four of the Alt-Burmester problems having finitely many solutions.…”
Section: Alt-burmester 4-bar Examplesmentioning
confidence: 99%
“…Specifying M poses and N = 10 − 2M positions, there will generically be finitely many linkages that take on the given poses and whose apex can pass through the given positions in its motion. Following [6] in isotropic coordinates, the M -pose and N -position Alt-Burmester problem is described by the following parameters: positions:…”
Section: Alt-burmester 4-bar Examplesmentioning
confidence: 99%