Abstract. Designing mechanical devices, called linkages, that draw a given plane curve has been a topic that interested engineers and mathematicians for hundreds of years, and recently also computer scientists. Already in 1876, Kempe proposed a procedure for solving the problem in full generality, but his constructions tend to be extremely complicated. We provide a novel algorithm that produces much simpler linkages, but works only for parametric curves. Our approach is to transform the problem into a factorization task over some noncommutative algebra. We show how to compute such a factorization, and how to use it to construct a linkage tracing a given curve. 1
This paper introduces an original analytical procedure for the computation of the planar curve in me...
This paper shows how, using elementary Distance Geometry, a closure polynomial of degree 8 for the D...
This paper discusses the loop closure equations and the solution of these nonlinear equations in the...
Abstract. Designing mechanical devices, called linkages, that draw a given plane curve has been a to...
This dissertation develops a mechanism design procedures to draw algebraic plane curves. In 1876, Al...
In general, high-order coupler curves of single-degree-of-freedom plane linkages cannot be properly ...
In general, high-order coupler curves of plane mechanisms cannot be properly traced by standard pred...
Kempe's Universality Theorem states that using linkages made only of rigid bars and freely rotating ...
We present a new algorithm for unfolding planar polygonal link-ages without self-intersection based ...
This paper deals with the classic problem of the synthesis of planar linkages for path generation. B...
We present a new algorithm for unfolding planar polyg-onal linkages without self-intersection based ...
This paper presents a procedure to synthesize planar linkages, composed of rigid links and revolute ...
This paper shows how, using elementary Distance Geometry, a closure polynomial of degree 8 for the D...
This paper presents a kinematic procedure to synthesize planar mechanisms, composed of rigid links a...
An elementary proof is given to show that a parametrised algebraic curve in the plane may be traced ...
This paper introduces an original analytical procedure for the computation of the planar curve in me...
This paper shows how, using elementary Distance Geometry, a closure polynomial of degree 8 for the D...
This paper discusses the loop closure equations and the solution of these nonlinear equations in the...
Abstract. Designing mechanical devices, called linkages, that draw a given plane curve has been a to...
This dissertation develops a mechanism design procedures to draw algebraic plane curves. In 1876, Al...
In general, high-order coupler curves of single-degree-of-freedom plane linkages cannot be properly ...
In general, high-order coupler curves of plane mechanisms cannot be properly traced by standard pred...
Kempe's Universality Theorem states that using linkages made only of rigid bars and freely rotating ...
We present a new algorithm for unfolding planar polygonal link-ages without self-intersection based ...
This paper deals with the classic problem of the synthesis of planar linkages for path generation. B...
We present a new algorithm for unfolding planar polyg-onal linkages without self-intersection based ...
This paper presents a procedure to synthesize planar linkages, composed of rigid links and revolute ...
This paper shows how, using elementary Distance Geometry, a closure polynomial of degree 8 for the D...
This paper presents a kinematic procedure to synthesize planar mechanisms, composed of rigid links a...
An elementary proof is given to show that a parametrised algebraic curve in the plane may be traced ...
This paper introduces an original analytical procedure for the computation of the planar curve in me...
This paper shows how, using elementary Distance Geometry, a closure polynomial of degree 8 for the D...
This paper discusses the loop closure equations and the solution of these nonlinear equations in the...