A Line Geometric Approach to Kinematic Acquisition of Geometric Constraints of Planar Motion

This paper studies the problem of planar motion generation from the perspective of line-geometric constraint identification and acquisition, following our previous work [1] that advocated a point-geometric approach to the same problem. Kinematic acquisition of geometric constraints is concerned with the identification or extraction of geometric constraints that are embedded in an explicitly given motion, which is defined either parametrically or discretely as an ordered sequence of displacements. The resulting geometric constraints can be used to obtain an implicit representation of the same motion, approximately. This process is called approximate implicitation of a motion.

When the geometric constraints are kinematic constraints associated with a planar mechanism, constraint identification process is equivalent to mechanism synthesis process [2–4]. Traditionally, mechanism design process adheres to the classical viewpoint that a kinematic mechanism is a collection of kinematic links connected with kinematic pairs or joints, and is therefore separated into two steps—type synthesis (determination of appropriate mechanism type for a given motion) and dimensional synthesis (determination of the dimensions for the resulting mechanism type). This mechanism-centric approach to mechanism design regards links, pairs, and their interconnection patterns as natural descriptors for a mechanism. However, these descriptors are unnatural for expressing the characteristics of a mechanism-generated motion, which leads to the gap between type and dimensional synthesis. It is believed that only through integrating these two distinct tasks in the design process, one can find the best mechanism with optimal type and ideal dimensions for a task motion. Recently, there have been several attempts to tackle the combined problem of type and dimensional synthesis. Hayes and Zsombor-Murrary [5] and Hayes and Rucu [6] developed a uniform polynomial system for integrated type and dimensional synthesis of planar dyads for rigid body guidance. Zhao et al. [7,8] presented a kinematic mapping based algorithm to the simultaneous type and dimensional synthesis of planar four-bar and six-bar mechanisms. In their work, the motion of four-bar coupler are viewed as being subject to three kinds of geometric constraints: a point of the coupler staying on a circle, a point of the coupler staying on a line, and a line of the coupler staying tangent to a circle; these three constraints are mechanically realizable by RR dyad, PR dyad, and RP dyad, respectively. By directly identifying the constraints from the task motion, types and dimensions of the dyads used to form the synthesized four-bar linkage can be determined. Li et al. [9] studied the rigid body guidance problem for three degrees of freedom (3DOF) planar parallel manipulators with a unified representation of six planar triads (RRR, RPR, PRR, PPR, RRP, and RPP).

This paper advocates a geometric-constraint based approach with a focus on the analysis of line trajectories associated with the motion, the goal of which is to obtain a line trajectory that can be constructed as a geometric condition that best describes the motion. Typically, this is done in a geometric constraint identification and acquisition process, i.e., by comparing various trajectories of a specified motion with known constraints from a library of mechanically realizable constraints. This effectively reduces the problem of mechanism synthesis to that of constraint identification and acquisition, and thus bridges the gap between type and dimensional synthesis.

The organization of the paper is as follows. Section 2 reviews the concepts of line trajectory and envelope curve for the development of this paper. Section 3 discusses the equiform transformation for line constraints. Sections 4 and 5 deal with the acquisition of geometric constraints in explicit form and implicit form, respectively. Section 6 illustrates with examples to demonstrate the effectiveness of the proposed approach.

This section provides a review of line trajectories in a plane insofar as necessary for the development of this paper.

Consider a planar displacement a rigid body shown in Fig. 1, which is composed of the translation (d_x, d_y) of a point on the moving body and the orientation angle α of the moving body. A coordinate frame denoted M is attached to the moving body, while F represents the fixed coordinate frame. It is typical to represent the planar displacement by a point coordinates transformation from M to F

where $v=(v1,v2,v3)$ and $V=(V1,V2,V3)$ are homogenous coordinates of a point in F and M, respectively.

where [I] is the 3 × 3 identity matrix.

Details on the general theory of envelopes from the perspective of differential geometry can be found in Refs. [10,11]. Line geometry has also found applications in computer-aided design of ruled surfaces and line congruences [12–16]. The connection of points and lines has also been studied by Zhang and Ting [17].

This equation can be either interpreted as constraining a point V on a line L or as constraining a line L such that it passes through a point V. The role of point coordinates V and line coordinates L is completely symmetric. This gives rise to the principle of duality in the projective plane, i.e., geometric transformations that replace points by lines and lines by points while preserving incidence properties among the transformed objects. In other words, any theorem or statement that is true for the projective plane can be reworded by substituting points for lines and lines for points, and the resulting statement will be true as well [18].

In conclusion, the mutual generation between the line motion and the envelope curve is bijective and unambiguous in the sense that one line motion results a unique envelope curve and this curve recovers the same lime motion. The converse statement is also true: a curve can set up a unique line motion and this line motion duplicates the same curve as its envelope. Consequently, the line trajectory and the envelope curve are dual to each other; the representation of a line trajectory can be replaced by its envelope curve and vice versa.

where $a=λ cos ξ$ and $b=λ sin ξ$ with ξ being the angle of rotation and λ being the scaling factor. The translation component is given by (c_x, c_y). The matrix $[E]$ contains four independent parameters $(a,b,cx,cy)$⁠.

where $D¯x=−cx cos ξ−cy sin ξ, D¯y=cx sin ξ−cy cos ξ$⁠, and $κ=1/λ$⁠. Thus, the line-geometric equiform transform has also four degrees of freedom and are defined by the parameters $(ξ,κ,D¯x,D¯y)$⁠.

For a given motion, the main objective of kinematic acquisition of line-geometric constraints is to identify a line l in the moving body such that its trajectory $L$ best approximates a desired line trajectory $G$⁠, as shown in Fig. 2. $G$ is equiformly transformed from the standard line constraint $g$⁠, i.e., $G=[E¯]g$⁠. Instead of being directly given as a line trajectory, the standard line constraint can also be indirectly given as its corresponding envelope. In this case, Eqs. (7) and (8) are used to convert the envelope constraint to the line constraint.

wherein $t∈[0,1]$ and the shift parameter $tΔ$ indicates how much the motion-shape correspondence has to be shifted. As a result, $L(tL)$ on $[0,1]$ match $G(tG)$ on $[tΔ,1+tΔ]$⁠.

This section presents an algorithm for identifying a given constraint from line trajectories of a specified motion task. This work can be considered as an extension of our earlier work on kinematic acquisition of point trajectories [1].

The goal for constraint acquisition is to find a line $l=(cos β, cos β,l)$ on the moving body such that the trajectory of l best approximates the given line trajectory constraint after an appropriate equiform displacement, $(ξ,κ,D¯x,D¯y)$⁠. So in total, we have six variables, $(β,l,ξ,κ,D¯x,D¯y)$⁠, to be determined.

Equation (23) contains only one unknown β, which can be solved using tangent half-angle substitution. Substituting β into Eq. (21), we obtain a trigonometric equation with one unknown ξ, which again can be obtained using tangent half-angle substitution. Finally, substituting β and ξ into Eq. (20), we obtain a 4 × 4 linear equation with unknown X, which can be readily solved.

So far, it has been assumed that the shift parameter n is given. In practice, the desired value of n is unknown beforehand. We now present a numerical algorithm for shape matching which combines least squares optimization with a direct search to deal with the shift parameter n:

Objective: Given a discrete motion M with N sampled positions and a geometric constraint line trajectory $g$ of N sampled points, find a line on the moving body $l=(cos β, sin β,l)$⁠, such that after the constraint line trajectory $g$ is transformed into to a new configuration $G$ via an equiform displacement, $(ξ,κ,D¯x,D¯y)$⁠, the error between the trajectory L and the constraint line trajectory $G$ as defined by Eq. (18) is at minimum.

Algorithm

 For each $n∈[1,…,N]$do

  For each $i∈[1,…,N]$do

   $•$ Initialize values of $Ai,n,d¯x,i,d¯y,i$⁠;

   $•$ Substitute $Ai,n,d¯x,i,d¯y,i$ into Eqs. (20), (21), and (23);

  End for

  $•$ Solve Eq. (23) for β;

  $•$ Substitute β into Eq. (21) and solve for ξ;

  $•$ Substitute β and ξ into Eq. (20) and solve for X;

  If the total error is currently at minimum do

   $•$ Update final solution to ${β,l,ξ,κ,D¯x,D¯y,n}$⁠;

  End if

 End for

The algorithm presented in Sec. 4 assumes that the line geometric constraints be explicitly given. This section studies the case where the constraints are implicitly given. We restrict our discussions to conics as they can be readily generated using simple 2DOF mechanisms (Fig. 3). A comprehensive treatise on the generation of the tangents to planar algebraic curves using planar mechanisms can be found in Ref. [19].

where [C] is called the matrix of the conic section, and nonsingular for nondegenerate conics. A conic is homogenously described by the six coefficients $(a,b,c,d,e,f)$⁠.

This means that the coordinates of the tangent line also satisfy a quadric equation, which is said to define a conic. Due to the principle of duality, the new conic $[C*]$ is said to be dual to the original conic [C].

The goal is to find $β,l,ξ,λ,cx,cy$ to minimize the above error. In this case, the error function is a quadric polynomial of $cos β, sin β,l, cos ξ, sin ξ,cx,cy$⁠, and λ. This means that we cannot solve them explicitly as we have done in Sec. 4. In this paper, a numerical method called simulated annealing is used to search for the solutions.

In what follows, we present an example to illustrate the effectiveness of our constraint identification and acquisition scheme. The given motion task is artificially designed such that one of the lines (0, 1, 0) in the moving body remains tangent to an ellipse, which has a major axis of length 5, a minor axis of length 3, and its center is located at point $(−1.5,1.0)$⁠. The angle between the major axis of the ellipse and the horizontal axis of the reference frame is 30 deg.

In the first part of this example, we test the algorithm presented in Sec. 4 that assumes that the tangent lines of the constraint curve are explicitly given. We use the green ellipse in Fig. 4 as our desired shape. For explicit constraint, the ellipse is given as a sequence of sample points. For the purpose of testing the algorithm, sample points on the constraint are identical to those on the ellipse used to construct the example motion. Hence, we expect the line (0, 1, 0) to be identified as a tangent moving line to the ellipse. Figure 5 depicts exactly the same constraint as the given one, while Fig. 6 shows another identification result which is also an elliptical constraint. The types and dimensions of the mechanisms producing the two identified constraints are also shown in Figs. 5 and 6. Both mechanisms are capable of generating the task motion independently.

Both synthesized mechanisms are of 2DOF and same type as the five-link mechanism shown in Fig. 3(b) from Sec. 5. A line on its end-effector moving frame is always tangent to an ellipse, as specifically demonstrated in Fig. 7. The fixed pivot A and C coincides with the center and one of the foci of the ellipse, respectively. The length of the crank AB is equal to half the major axis of the ellipse, while the distance between the axes of fixed pivot A and C is equal to half the focal distance. The end-effector moving frame is rigidly connected with the slide-block, located at the prismatic joint D. A line on the moving frame and collinear with the link PD remains always tangent to the ellipse at the point P. For the proof that the curve enveloped by the line PD is actually an ellipse, see Artobolevsky [19] for details. Thus, two elliptical constraints are identified by our line geometric approach, with the types and dimensions of the associated mechanisms being simultaneously determined.

In this case, in addition to the original constraint, we have obtained multiple solutions of good quality, as demonstrated in Figs. 8 and 9. The two 2DOF synthesized mechanisms, associated with the identified constraints and as well shown in Figs. 8 and 9, are of the same type but different dimensions, either of which can be selected to generate the task motion. Furthermore, the task motion can be viewed as a planar motion subject to the two identified constraints. Therefore, a 1DOF closed-loop mechanism can be synthesized, as shown in Fig. 10, with the two 2DOF mechanisms as components.

In this paper, we have successfully extended the method to extract point geometric constraints from a specified motion task to line geometric constraint by resorting to the duality of point and lines. The resulting constraints can then be used to identify and synthesize simple mechanisms for constraint generation. This task-oriented and constraint-based paradigm to mechanism design greatly reduces the complexity of the simultaneous type and dimensional synthesis problem.

The work has been financially supported by U.S. National Science Foundation (Grant No. CMMI-1563413) and the Fundamental Research Funds for the Central Universities of China (No. 2682015BR004). The authors also thank Sichuan Provincial Machinery Research and Design Institute (China) for their support. All findings and results presented in this paper are those of the authors and do not represent those of the funding agencies.