A distinct matrix representation of the planar kinematic chains and isomorphism recognition

M. S. Alam; M. Suhaib

doi:10.15282/jmes.13.4.2019.01.0457

A distinct matrix representation of the planar kinematic chains and isomorphism recognition

JOURNAL OF MECHANICAL ENGINEERING AND SCIENCES ◽

10.15282/jmes.13.4.2019.01.0457 ◽

2019 ◽

Vol 13 (4) ◽

pp. 5717-5734

Author(s):

M. S. Alam ◽

M. Suhaib

Keyword(s):

Mechanism Design ◽

Design Problem ◽

Matrix Representation ◽

Degree Of Freedom ◽

New Method ◽

Structural Synthesis ◽

Primary Condition ◽

Secondary Conditions ◽

Kinematic Chains ◽

Three Degree Of Freedom

Structural synthesis of kinematic chains has been an indispensable area of the mechanism-design problem. The duplication may occur while developing kinematic chains. Therefore, an isomorphic test is required to eliminate duplication. For this purpose, the numbers of methods are proposed during recent years. However, most of the methods are complex and difficult to understand, and fulfil the only primary condition, but not the secondary conditions for isomorphism detection. In the present work, a new method is introduced to detect isomorphism in planar kinematic chains (KCs) fulfilling both primary and secondary conditions. First, KC’s are topologically transformed into skeleton diagrams, and then skeleton matrices [S] and identification strings [IS] are formulated consequently. In order to detect isomorphism, the IS is considered as an invariant string of a KC which in turn, enables the detection of isomorphism between the KCs. The proposed method accurately recognizes isomorphism up to 12 links KCs with no counter examples found in the literature. Three examples with one degree of freedom having 10 links 12 joints, 10 links 13 joints and 12 links three degree of freedom systems are introduced to reveal the reliability and strength of the proposed method.

Structural synthesis of plane kinematic chain inversions without detecting isomorphism

Mechanical Sciences ◽

10.5194/ms-12-1061-2021 ◽

2021 ◽

Vol 12 (2) ◽

pp. 1061-1071

Author(s):

Jinxi Chen ◽

Jiejin Ding ◽

Weiwei Hong ◽

Rongjiang Cui

Keyword(s):

Mechanism Design ◽

Adjacency Matrix ◽

Synthesis Method ◽

Kinematic Chain ◽

Degree Of Freedom ◽

Synthesis Methods ◽

Creative Design ◽

Structural Synthesis ◽

Kinematic Chains

Abstract. A plane kinematic chain inversion refers to a plane kinematic chain with one link fixed (assigned as the ground link). In the creative design of mechanisms, it is important to select proper ground links. The structural synthesis of plane kinematic chain inversions is helpful for improving the efficiency of mechanism design. However, the existing structural synthesis methods involve isomorphism detection, which is cumbersome. This paper proposes a simple and efficient structural synthesis method for plane kinematic chain inversions without detecting isomorphism. The fifth power of the adjacency matrix is applied to recognize similar vertices, and non-isomorphic kinematic chain inversions are directly derived according to non-similar vertices. This method is used to automatically synthesize 6-link 1-degree-of-freedom (DOF), 8-link 1-DOF, 8-link 3-DOF, 9-link 2-DOF, 9-link 4-DOF, 10-link 1-DOF, 10-link 3-DOF and 10-link 5-DOF plane kinematic chain inversions. All the synthesis results are consistent with those reported in literature. Our method is also suitable for other kinds of kinematic chains.

A New Algorithm for Unique Representation and Isomorphism Detection of Planar Kinematic Chains with Simple and Multiple Joints

Processes ◽

10.3390/pr9040601 ◽

2021 ◽

Vol 9 (4) ◽

pp. 601

Author(s):

Mahmoud Helal ◽

Jong Wan Hu ◽

Hasan Eleashy

Keyword(s):

Degree Of Freedom ◽

Synthesis Process ◽

Structural Synthesis ◽

Joint Configuration ◽

Unique Representation ◽

Kinematic Chains

In this work, a new algorithm is proposed for a unique representation for simple and multiple joint planar kinematic chains (KCs) having any degree of freedom (DOF). This unique representation of KCs enhances the isomorphism detection during the structural synthesis process of KCs. First, a new concept of joint degree is generated for all joints of a given KC based on joint configuration. Then, a unified loop array (ULA) is obtained for each independent loop. Finally, a unified chain matrix (UCM) is established as a unique representation for a KC. Three examples are presented to illustrate the proposed algorithm procedures and to test its validity. The algorithm is applied to get a UCM for planar KCs having 7–10 links. As a result, a complete atlas database is introduced for 7–10-link non-isomorphic KCs with simple or/and multiple joints and their corresponding unified chain matrix.

A new closed-form kinematics of the generalized 3-DOF spherical parallel manipulator

Robotica ◽

10.1017/s0263574799001630 ◽

1999 ◽

Vol 17 (5) ◽

pp. 475-485 ◽

Cited By ~ 23

Author(s):

Zhen Huang ◽

Y. Lawrence Yao

Keyword(s):

Closed Form ◽

Analytical Method ◽

Parallel Manipulator ◽

Degree Of Freedom ◽

New Method ◽

Numerical Example ◽

Three Degree Of Freedom ◽

Spherical Parallel Manipulator

This paper presents a new method to analyze the closed-form kinematics of a generalized three-degree-of-a-freedom spherical parallel manipulator. Using this analytical method, concise and uniform solutions are achieved. Two special forms of the three-degree-of-freedom spherical parallel manipulator, i.e. right-angle type and a decoupled type, are also studied and their unique and interesting properties are investigated, followed by a numerical example.

Equivalent Kinematic Chains of Three Degree-of-Freedom Tripod Mechanisms With Planar-Spherical Bonds

Journal of Mechanical Design ◽

10.1115/1.1825439 ◽

2005 ◽

Vol 127 (1) ◽

pp. 95-102 ◽

Cited By ~ 36

Author(s):

Patrick Huynh ◽

Jacques M. Herve´

Keyword(s):

Closed Loop ◽

Degree Of Freedom ◽

Robotic Device ◽

Kinematics Analysis ◽

Closed Loop System ◽

Short Introduction ◽

Kinematic Chains ◽

Displacement Group ◽

Three Degree Of Freedom ◽

Moving Spheres

The paper aims to analyze the equivalent kinematic chains of a family of three-degree-of-freedom (3-DOF) tripod mechanisms with planar-spherical bonds in order to determine the platform motions generated by the mechanisms, and then to develop a prototype of a 3-DOF 3-RPS type parallel mechanism, which can be used as a wrist robotic device. After a short introduction to mechanical generators of Lie subgroups of displacement, the mobility formula of a general 3-DOF tripod mechanism based on the modified Gru¨ebler’s criterion is given. Using displacement group theory theorems, the analyzed closed-loop system becomes finally equivalent to three contacts between a rigid assembly of three moving spheres onto three fixed planes. As an application of the above method, a prototype mechanism is designed and fabricated based on the kinematics analysis, the force capability and the simplicity.

Structural Synthesis of Planar 10-Link 1-DOF Kinematic Chains with up to Pentagonal Links with All Possible Multiple Joint Assortments for Mechanism Design

New Advances in Mechanism and Machine Science - Mechanisms and Machine Science ◽

10.1007/978-3-319-79111-1_3 ◽

2018 ◽

pp. 27-35 ◽

Cited By ~ 4

Author(s):

V. Pozhbelko ◽

E. Kuts

Keyword(s):

Mechanism Design ◽

Structural Synthesis ◽

Kinematic Chains

A New Algorithm for the Determination of the Workspace of Complex Planar Kinematic Chains

Volume 1: 21st Design Automation Conference ◽

10.1115/detc1995-0112 ◽

1995 ◽

Author(s):

Pascal Lê-Huu ◽

Clément M. Gosselin

Keyword(s):

Numerical Solution ◽

Inverse Kinematics ◽

Degree Of Freedom ◽

Topological Graph ◽

Kinematic Chains ◽

Cartesian Space ◽

Hybrid Manipulator ◽

Three Degree Of Freedom ◽

Two Degree Of Freedom

Abstract A new algorithm for the determination of the workspace of complex planar kinematic chains is presented in this paper. This algorithm is completely general since it can deal with any kind of topological graph and any set of parameters defined in a convention of notation. It uses the numerical solution of the inverse kinematics and is based on a wavefront expansion in the Cartesian space. Three examples are presented here, and lead to a dexterity mapping for two two-degree-of-freedom multi-loop manipulators and a three-degree-of-freedom hybrid manipulator.

A More Direct Method for Structural Synthesis of Simple-Jointed Planar Kinematic Chains

23rd Biennial Mechanisms Conference: Mechanism Synthesis and Analysis ◽

10.1115/detc1994-0231 ◽

1994 ◽

Author(s):

Varada Raju Dharanipragada ◽

Nagaraja Kumar Yenugadhati ◽

A. C. Rao

Keyword(s):

Graph Theory ◽

Computer Program ◽

Reliable Method ◽

Direct Method ◽

Kinematic Chain ◽

Degree Of Freedom ◽

Structural Synthesis ◽

Indirect Methods ◽

Kinematic Chains ◽

A Chain

Abstract Structural synthesis of kinematic chains leans heavily on indirect methods, most of them based on Graph Theory, mainly because reliable isomorphism tests are not available. Recently however, the first and third authors have established the Secondary Hamming String of a kinematic chain as an excellent indicator of its isomorphism. In the present paper this Hamming String method was applied with slight modifications for synthesizing on a PC-386, distinct kinematic chains with given number of links and family description. The computer program, written in Pascal, generated both the six-bar and all 16 eight-bar chains as well as one sample family (2008) of ten-bar chains, verifying previously established results. Hence this paper presents a direct, quick and reliable method to synthesize planar simple-jointed chains, open or closed, with single- or multi-degree of freedom, containing any number of links. A spin-off of this paper is a simple, concise and unambiguous notation for representing a chain.

Computational Identification of Link Adjacency and Joint Incidence in Kinematic Chains and Mechanisms

Journal of Mechanical Design ◽

10.1115/1.2936931 ◽

2008 ◽

Vol 130 (8) ◽

Cited By ~ 5

Author(s):

Chin-Hsing Kuo ◽

Chien-Jong Shih

Keyword(s):

Mechanism Design ◽

Design Automation ◽

Systematic Approach ◽

Computational Approach ◽

Structural Synthesis ◽

Kinematic Chains ◽

Careful Observation ◽

Synthesis Of Mechanisms ◽

Computational Identification ◽

Observation Method

The identification of link adjacency and joint incidence of kinematic chains and mechanisms is important and essential prior to the task of conceptual mechanism design. A careful observation method can be done in general; however, a computational approach is particularly needed for the design automation and algorithmic enumeration. This paper proposes a systematic approach for this goal in which a pseudogenetic concept is employed. The graph identification is then generalized from which the identifications of kinematic chains and mechanisms are automatically mapped. The illustrative examples show that the computation is simple and easily programmable. This development is helpful for the automated structural synthesis of mechanisms.

Parallel Computational Algorithms for the Kinematics and Dynamics of Planar and Spatial Parallel Manipulators

Journal of Dynamic Systems Measurement and Control ◽

10.1115/1.2801147 ◽

1996 ◽

Vol 118 (1) ◽

pp. 22-28 ◽

Cited By ~ 49

Author(s):

C. M. Gosselin

Keyword(s):

Inverse Kinematics ◽

Parallel Manipulator ◽

Inverse Dynamics ◽

Parallel Manipulators ◽

Degree Of Freedom ◽

Kinematic Chains ◽

Novel Approach ◽

Judicious Choice ◽

Six Degree Of Freedom ◽

Three Degree Of Freedom

This paper introduces a novel approach for the computation of the inverse dynamics of parallel manipulators. It is shown that, for this type of manipulator, the inverse kinematics and the inverse dynamics procedures can be easily parallelized. The result is a closed-form efficient algorithm using n processors, where n is the number of kinematic chains connecting the base to the end-effector. The dynamics computations are based on the Newton-Euler formalism. The parallel algorithm arises from a judicious choice of the coordinate frames attached to each of the legs, which allows the exploitation of the parallel nature of the mechanism itself. Examples of the application of the algorithm to a planar three-degree-of-freedom parallel manipulator and to a spatial six-degree-of-freedom parallel manipulator are presented.

Bilinear Amplitude and Frequency Approximation for Nonlinear Systems With Gaps or Prestress

Volume 8: 28th Conference on Mechanical Vibration and Noise ◽

10.1115/detc2016-59062 ◽

2016 ◽

Cited By ~ 1

Author(s):

Kiran D’Souza ◽

Meng-Hsuan Tien

Keyword(s):

Bilinear System ◽

Bilinear Systems ◽

Degree Of Freedom ◽

New Method ◽

Time Interval ◽

Time Intervals ◽

Vibrational Response ◽

Three Degree Of Freedom ◽

System 1 ◽

Frequency Approximation

Analysis of the dynamics of bilinear systems is critical for a variety of civil, mechanical and aerospace structures that contain gaps or prestress that are caused by cracks, delamination, joints or interfaces amongst components. Recently, a method was developed called bilinear amplitude approximation (BAA) to estimate the response of bilinear systems without gaps or prestress. This method was developed on the idea that the bilinear system can be separated into two time intervals both of which the system behaves as a distinct linear system: (1) the open state and (2) the closed or sliding state. In order to couple the linear vibrational response for each time interval, both geometric and momentum constraints are applied as transition conditions between the states. This paper expands the previous BAA method for the case where there are either gaps or prestress in the system. The new method requires the forcing magnitude to be known so that it can accurately determine when the system transitions between the two states, and the new equilibrium positions for each state for a given forcing magnitude. The new method also finds the bilinear frequency of the system, which cannot be computed using the bilinear frequency approximation (BFA) method previously developed since that method is only accurate for the zero gap and no prestress case. The new BAA and BFA methods are demonstrated on single degree of freedom and three degree of freedom systems for a variety of forcing conditions.