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1、Balancing of shaking forces and shaking moments for planar mechanisms using the equimomental systemsHimanshu Chaudhary *, Subir Kumar SahaDepartment of Mechanical Engineering, Indian Institute of Technology Delhi, Hauz Khas, New Delhi 110016, IndiaReceived 30 March 2006; received in revised form 27
2、March 2007; accepted 6 April 2007 Available online 7 June 2007AbstractA general mathematical formulation of optimization problem for balancing of planar mechanisms is presented in this paper. The inertia properties of mechanisms are represented by dynamically equivalent systems, referred as equimome
3、ntal systems, of point-masses to identify design variables and formulate constraints. A set of three equimomental point-masses for each link is proposed. In order to determine the shaking forces and the shaking moments, the dynamic equations of motion for mechanisms are formulated systematically in
4、the parameters related to the equimomental point-masses. The formulation leads to an optimization scheme for the mass distribution to improve the dynamic performances of mechanisms. The method is illustrated with two examples. Balancing of combined shaking force and shaking moment shows a significan
5、t improvement in the dynamic performances compared to that of the original mechanisms. Keywords: Multiloop mechanism; Optimization; Shaking force; Shaking moment; Equimomental system1. IntroductionBalancing of shaking forces and shaking moments in mechanisms is important in order to improve their dy
6、namic performances and fatigue life by reducing vibration, noise and wear. Several methods are developed to eliminate the shaking forces and shaking moments in planar mechanisms. The methods to completely eliminate the shaking force are generally based on making the total mass centre of a mechanism
7、stationary. Different techniques are used for tracing and making it stationary. The method of principal vectors 1 describes the position of the mass centre by a series of vectors that are directed along the links. These vectors trace the mass centre of the mechanism at hand and the conditions are de
8、rived to make the system mass centre stationary. A more referred method in the literature is the method of linearly independent vectors 2, which make the total mass centre of a mechanism stationary. This is achieved by redistributing the link masses in such a manner that the coefficient of the time-
9、dependent terms of the equations describing the total centre of mass trajectory vanish. Kosav 3 presented a general method using ordinary vector algebra instead of the complex number representation of the vectors 2 for full force balance of planar linkages. One of the attractive features of a force-
10、balanced linkage is that the shaking force vanishes, and the shaking moment reduces to a pure torque which is independent of reference point. However, only shaking force balancing is not effective in the balancing of mechanism. There are many drawbacks of the complete shaking force balancing. For ex
11、ample, (a) it mostly increases the total mass of the mechanism, (b) it needs some arrangement like counterweights to add increased mass, and (c) it increases the other dynamic characteristics, e.g., shaking moment, driving torque, and bearing reactions. The influence of the complete shaking force ba
12、lancing is thoughtfully investigated by Lowen et al. 4 on the bearing reactions, input-torque, and shaking moment for a family of crank-rocker four-bar linkages. This study shows that these dynamic quantities increase and in some cases their values rise up to five-times.Several authors attempted the
13、 balancing problem as a complete shaking force and shaking moment balancing. Elliot and Tesar 5 developed a theory of torque, shaking force, and shaking moment balancing by extending the method of linearly independent vectors. Complete moment balancing is also achieved by a cam-actuated oscillating
14、counterweight 6, inertia counterweight and physical pendulum 7, and geared counterweights 810. More information on complete shaking moment balancing can be obtained in a critical review by Kosav 11, and Arakelian and Smith 12. Practically these methods not only increase the mass of the system but al
15、so increase its complexity.An alternate way to reduce the shaking force and shaking moment along with other dynamic quantities such as input-torque, bearing reactions, etc., is to optimize all the completing dynamic quantities. Since shaking moment reduces to a pure torque in a force-balanced linkag
16、e, many researchers used the fact to develop their theory of shaking moment optimization. Berkof and Lowen 13 proposed an optimization method for the root-mean-square of the shaking moment in a fully force-balanced in-line four-bar linkage whose input link is rotating at a constant speed. As an exte
17、nsion of this method Carson and Stephenes 14 highlighted the need to consider the limits of feasibility of the link parameters. A different approach for the optimization of shaking moment in a force-balanced four-bar linkage is proposed by Hains 15. Using the principle of the independence of the sta
18、tic balancing properties of a linkage from the axis of rotation of the counterweights, partial shaking moment balancing is suggested in 16. On the other hand, the principle of momentum conservation is used by Wiederrich and Roth 17 to reduce the shaking moment in a fully force-balanced four-bar link
19、age.Dynamic quantities, e.g., shaking force, shaking moment, input-torque, etc., depend on the mass and inertia of each link, and its mass centre location. These inertia properties of mechanism can be represented more conveniently using the dynamically equivalent system of point-masses 18,21. The dy
20、namically equivalent system is also referred as equimomental system. The concept is further elaborated by Wenglarz et al. 19 and Huang 20. Using the concept of equimomental system Sherwood and Hockey 21 presented the optimization of mass distribution in mechanisms. Hockey 22 discussed the input-torq
21、ue fluctuations of mechanisms subject to external loads by means of properly distributing the link masses. Using the two point-mass model, momentum balancing of four-bar linkages was presented in 17. Optimum balancing of combined shaking force, shaking moment, and torque fluctuations in high speed l
22、inkages is reported in 23,28, where a two point-mass model was used. The concept can also be applied for kinematic and dynamic analyses of mechanisms 24,25, and the minimization of inertia-induced forces 26,27 of spatial mechanisms. Although scattered, the applications of equimomental system are fou
23、nd in the above literatures. None of them, however, presents a comprehensive study of the concept and its application in the balancing of mechanisms.As discussed above, only shaking force balancing of mechanisms does not imply their balancing of shaking moment. In order to reduce inertia-induced for
24、ces, e.g., the shaking force and shaking moment, along with other dynamic quantities such as input-torque and bearing reactions, it is required to trade-off among these competing dynamic quantities. The analytical solution to the optimization of shaking force and shaking moment is difficult, and pos
25、sible only for simple planar linkages. Hence, balancing aspect of mechanisms is postulated as an optimization problem in this paper. Once the mathematical optimization problem is formulated, one can use the existing computer libraries to solve it. The formulation of the optimization problem, neverth
26、eless, is difficult because it needs the following:1. formulation of dynamic equations to calculate the joint reactions and other dynamic characteristics;2. identification of the design variables and formulation of the constraints that define the design space of feasible solutions; and3. an objectiv
27、e function which is to be used as an index of merit for the dynamic performance of a linkage at hand.In this paper, the first difficulty is overcome by formulating the equations of motion of a closed-loop system in minimal set using the joint-cut method. Concerning the second difficulty, the design
28、variables and the constraints are identified by introducing the equimomental system of point-masses. The formulation leads to an optimization scheme for the mass distribution of bodies to optimize the dynamic performances, e.g., shaking force and shaking moment, and driving torque fluctuations. A no
29、velty of the present approach is that the balancing problem of mechanisms is formulated as a general mathematical optimization problem. The methodology is quite general and not restricted only to single-loop four-bar linkage as reported in 28. The dynamic analysis presented in 28 is extended in this
30、 paper for multiloop systems as well. The optimization methodology proposed in this paper is also more effective than those reported in 23,28, as explained in Section 4.1.2. It gives flexibility to the designer to put constraints according to the application. Our original claims in this paper are: (
31、i) the dynamic modelling of an n-link multiloop mechanism, (ii) the formulation of the optimization problem for the n-link multiloop mechanism, and (iii) the use of three point-mass systems for the dynamic modelling and optimization of the mechanism mentioned in steps (i) and (ii) above. The propose
32、d methodology is illustrated with two examples. In the first example, a four-bar linkage is considered. The effectiveness of the method is shown by comparing the analytical results 2 for full force balancing of the four-bar linkage. The other example is multiloop mechanism used in carpet scraping ma
33、chine for cleaning carpets.This paper is organized as follows. Section 2 explains the concept of equimomental system for a rigid body undergoing in a plane motion. Optimization problem formulation for a mechanism using the equimomental concept is shown in Section 3. The effectiveness of the methodol
34、ogy is illustrated in Section 4 using two mechanisms. Finally, conclusions are given in Section 5. Two Appendices A and B are provided additionally to derive the equations of motion using three point-mass model and its comparison with two point-mass model, respectively.2. Equimomental systemA compre
35、hensive study of the equimomental system of a rigid body undergoing in a plane motion is presented in this section. The sets of equimomental point-masses for the rigid body are proposed in order to obtain equimomental system of the original system consisting of interconnected rigid bodies. The conce
36、pt is illustrated using three point-mass model.As shown in Fig. 1, consider a rigid body whose the centre of mass at C and a coordinate frame OXY fixed to it at O. Motion of the body takes place in the XY plane. We seek a set of dynamically equivalent system of npoint-masses rigidly fixed to the loc
37、al frame. Each point-mass has its mass mi and located at coordinates xi; yi in the local frame. For planar motion, the requirements of the dynamical equivalence of the system of point-masses and the original rigid body are 19: (a) the same mass; (b) the same centre of mass; and (c) the same moment o
38、f inertia about an axis perpendicular to the plane and passing through origin, O, i.e.,where m and 7c are the mass and the moment of inertia about the centre of mass, C(x, y), of the rigid body, respectively.Since each mass introduces three parameters (mnx,-,yt) to identify it, 3 parameters are requ
39、ired for n point-masses. Only four parameters out of them can be obtained uniquely from Eqs. (1)-(4) assigning the remaining (3 4) arbitrary values. The number of arbitrarily assigned parameters increases with the number of point-masses. With a single point-mass having only three unknown parameters
40、and four equations, Eqs. (1)-(4), lead to overdetermined system of equations, which has no solution unless the equations are consistent. Moreover, two point masses have the six unknown parameters 28. The four parameters out of them can be solved uniquely assigning the other two. Hence, minimum two p
41、oint masses are required to represent a rigid body moving in a plane. However, it is not always possible to get all point-masses positive.To illustrate the procedure of finding a set of dynamically equivalent point-masses, consider a three point-mass model of a rigid body moving in the XY plane. The
42、 polar coordinates, Fig. 1, of the point-masses are (/,-, Oj), for i = 1,2, 3, where /, = Jx2 + y2 and 9 = tan (y/xt). The three point-mass model would then be dynamically equivalent to the original rigid body if Eqs. (1)-(4) are satisfied, i.e.,where d = Jx2 + y2 and 9 = tan_1(j/x) are polar coordi
43、nates of the mass centre of the rigid body. Moreover, SO = sin 9, CO = cos 9, and mlc = Ic + md k being the radius of gyration about the point, O. Note that there are nine unknowns, namely, mit /, and 9, for i= 1,2,3, and four equations. Now, it is important to decide which five parameters would be
44、chosen arbitrarily so that the remaining four are solved uniquely. It is advisable to choose /,- and 9t so that the dynamic equivalence conditions become linear in point-masses. Hence, assigning I2, h and 9, for i= 1,2,3, the remaining, i.e., four parameters, m1, m2, m3, and l1 are determined unique
45、ly using Eqs. (5)-(8). Assuming /2 = l1; h = h and substituting them in Eq. (8), yields l1 = k. Taking the positive value for l1 that is physically possible, the three point-masses are then determined from Eqs. (5)-(7). Substituting l1 = k in Eqs. (5)-(7), these equations can be written aswhere the
46、3x3 matrix, K, and the 3-vectors, m and b are as follows:From Eq. (9), it is clear that the solution for m exists if det(K) 5 0, i.e., h1 5 h2, h1 5 h3, and h2 5 h3. It means that any two point masses should not lie on the same radial line emanating from the origin O. The vector m can be obtained as
47、in which, det(K) = k2S(93 02) + 5(02 01) + 5(01 03). It is evident from the solution, Eq. (11), that the sum of the point-masses is equal to the mass of the body for any values of angles except 01 92, 01 = 03, and 01 7 03. Note here that, there is a possibility of some point masses becoming negative
48、. However, it does not hindrance the process of representing the rigid body as long as the total mass and the moment of inertia about the polar axis through centre of mass give positive value 21. As an example, if 01 = 0; 02 = 2p/3; and 03 = 4p / 3, the point masses are calculated as From Eqs. (13)
49、to (15), if the origin point, O, coincides with the mass centre of the body, C, i.e., d = 0, then m1 = m2 = m3 = m/3, which means that the point masses of the body is distributed equally, and located on the circumference of a circle having radius k.In mechanism analysis, the links are often considered one-dimensional, e.g., a straight rod, in which its diameter or width and thickness are ver
