Top

Meccanica

Published in:

01-04-2014

Kinematical analysis of overconstrained and underconstrained mechanisms by means of computational algebraic geometry

Authors: T. Arponen, A. Müller, S. Piipponen, J. Tuomela

Published in: Meccanica | Issue 4/2014

Activate our intelligent search to find suitable subject content or patents.

search-config

AI-assisted search

Off

Abstract

We investigate and explain several exceptional phenomena appearing in mechanism kinematics. The starting point for the kinematical analysis of a mechanism is the formation of the relevant constraint map defining the constraint equations for the coordinates of the particular system. The constraint equations define the configuration space of the mechanism, which reveals the essential kineamtic characteristics. But in some cases the properties of the map, and not the configuration space itself, are important. This is true for example for so called under- and overconstrained mechanisms for which the standard formulation of constraints gives usually not enough or too many constraints when considering the dimension of their configuration space. These concepts also naturally lead to the concept of kinematotropic mechanisms which posses motion modes of different dimension. In this context the concept of a kinematotropy as a motion between such modes is introduced in this paper. We present a general approach to the kinematic analysis of mechanisms using the theory of algebraic geometry and tools of computational algebraic geometry. The configuration space is considered as a real algebraic variety defined by the constraints. The phenomena and needed theory are explained and several illustrative examples are given. In particular the underconstrained phenomenon is explained by considering the real and complex dimension of the configuration space variety.

previous article Reliability for design of planetary gear drive units

next article Analysis of curved beams using a new differential transformation based curved beam element

Dont have a licence yet? Then find out more about our products and how to get one now:

Springer Professional "Wirtschaft+Technik"

Online-Abonnement

Mit Springer Professional "Wirtschaft+Technik" erhalten Sie Zugriff auf:

über 102.000 Bücher
über 537 Zeitschriften

aus folgenden Fachgebieten:

Automobil + Motoren
Bauwesen + Immobilien
Business IT + Informatik
Elektrotechnik + Elektronik
Energie + Nachhaltigkeit
Finance + Banking
Management + Führung
Marketing + Vertrieb
Maschinenbau + Werkstoffe
Versicherung + Risiko

Jetzt Wissensvorsprung sichern!

inform now

Springer Professional "Technik"

Online-Abonnement

Mit Springer Professional "Technik" erhalten Sie Zugriff auf:

über 67.000 Bücher
über 390 Zeitschriften

aus folgenden Fachgebieten:

Automobil + Motoren
Bauwesen + Immobilien
Business IT + Informatik
Elektrotechnik + Elektronik
Energie + Nachhaltigkeit
Maschinenbau + Werkstoffe

Jetzt Wissensvorsprung sichern!

inform now

Available only for authorised users

Here \(\mathbb{Q}(\alpha)\) means the field of rational functions depending on α.

The notation \(\mathbb{Q}(\sqrt{2})\) here means that we are working over (finite) extensions field of \(\mathbb{Q}\) where a number \(\sqrt{2}\) has been added by using appropriate minimal polynomial.

Note that the mechanism can be over and underconstrained at the same time!

Blaschke W (1960) Kinematik und Quaternionen. Springer, Berlin MATH

Husty M, Schröcker HP (2010) Algebraic geometry and kinematics. The IMA volumes in mathematics and its applications, vol 151, pp 85–107

Alizade R, Bayram C, Gezgin E (2007) Structural synthesis of serial platform manipulators. Mech Mach Theory 42(5):580–599 CrossRefMATHMathSciNet

Gogu G (2005) Mobility of mechanisms: a critical review. Mech Mach Theory 40(9):1068–1097 CrossRefMATHMathSciNet

Cox D, Little J, O’Shea D (2007) Ideals, varieties and algorithms, 3rd edn. Springer, Berlin CrossRefMATH

Greuel G-M, Pfister G (2002) A singular introduction to commutative algebra. Springer, Berlin. With contributions by Olaf Bachmann, Christoph Lossen and Hans Schönemann, with 1 CD-ROM (Windows, Macintosh, and UNIX) CrossRefMATH

Sommese AJ, Wampler CW (2005) The numerical solution of systems of polynomials arising in engineering and science. World Scientific, Singapore CrossRefMATH

Arikawa K (2009) Mobility analysis of robotic mechanisms based on computer algebra. In: ASME IDETC/CIE 2009, San Diego, California, USA, August 30–September 2. ASME, New York

Gan D, Liao Q, Dai JS, Wei S, Seneviratne LD (2009) Forward displacement analysis of the general 6-6 Stewart mechanism using Gröbner bases. Mech Mach Theory 44(9):1640–1647 CrossRefMATH

10.

Husty M, Pfurner M, Schröcker HP, Brunnthaler K (2007) Algebraic methods in mechanism analysis and synthesis. Robotica 25(6):661–675 CrossRef

11.

Pfurner M, Husty M, Schröcker HP (2007) A method to determine the motion of overconstrained 6r-mechanisms. In: 12th IFToMM world congress, Besançon, France, June 18–21 2007, pp 18–21

12.

Nawratil G (2013) Types of self-motions of planar Stewart Gough platforms. Meccanica 48(5):1177–1190 CrossRefMathSciNet

13.

Arponen T, Piipponen S, Tuomela J (2008) Analysis of singularities of a benchmark problem. Multibody Syst Dyn 19(3):227–253 CrossRefMATHMathSciNet

14.

Arponen T, Piipponen S, Tuomela J (2009) Kinematic analysis of Bricard’s mechanism. Nonlinear Dyn 56(1–2):85–99 CrossRefMATHMathSciNet

15.

Piipponen S (2009) Singularity analysis of planar linkages. Multibody Syst Dyn 22(3):223–243 CrossRefMATHMathSciNet

16.

Racila L, Dahan M (2010) Spatial properties of Wohlhart symmetric mechanism. Meccanica 45(2):153–165 CrossRefMATH

17.

Fernández de Bustos I, Avilés R, Aguirrebeitia J, Ansola R (2012) Second order mobility analysis of mechanisms using closure equations. Meccanica 47(7):1695–1704 CrossRefMathSciNet

18.

Wampler C, Hauenstein J, Sommese A (2011) Mechanism mobility and a local dimension test. Mech Mach Theory 46(9):1193–1206 CrossRefMATH

19.

Greuel G-M, Pfister G, Schönemann H (2012) Singular 3.1.5. a computer algebra system for polynomial computations. Centre for Computer Algebra, University of Kaiserslautern

20.

Decker W, Lossen C (2006) Computing in algebraic geometry. Algorithms and computation in mathematics, vol 16. Springer, Berlin MATH

21.

Cox D, Little J, O’Shea D (2005) Using algebraic geometry, 2nd edn. Graduate texts in mathematics, vol 185. Springer, New York MATH

22.

Hulek K (2003) Elementary algebraic geometry. Student mathematical library, vol 20. American Mathematical Society, Providence MATH

23.

Kreuzer M, Robbiano L (2005) Computational commutative algebra 2. Springer, Berlin

24.

Smith K-E, Kahanpää L, Kekäläinen P, Traves W (2000) An invitation to algebraic geometry. Springer, New York CrossRefMATH

25.

Piipponen S, Tuomela J (2013) Algebraic analysis of kinematics of multibody systems. Mech Sci 4(1):33–47. doi:10.5194/ms-4-33-2013. http://www.mech-sci.net/4/33/2013/ CrossRef

26.

Wohlhart K (1996) Kinematotropic linkages. In: Lenarcic J, Parenti-Castelli V (eds) Recent advances in robot kinematics. Kluwer Academic, Dordrecht, pp 359–368 CrossRef

27.

Müller A (2009) On the concept of mobility used in robotics. In: 33rd mechanisms & robotics conference, ASME 2009 international design engineering technical conferences, San Diego, CA, USA, August 30–September 2 2009. ASME, New York, pp 1–8

28.

Galletti C, Fanghella P (2001) Single-loop kinematotropic mechanisms. Mech Mach Theory 36(6):743–761 CrossRefMATHMathSciNet

29.

Wunderlich W (1954) Ein merkwürdiges zwölfstabgetriebe. Österr Ingenieurarchiv 8(2/3):224–228 MATHMathSciNet

30.

Arponen T, Piipponen S, Tuomela J (2013) Kinematical analysis of Wunderlich mechanism. Mech Mach Theory 70(2):16–31 CrossRef

Title: Kinematical analysis of overconstrained and underconstrained mechanisms by means of computational algebraic geometry
Authors: T. Arponen
A. Müller
S. Piipponen
J. Tuomela
Publication date: 01-04-2014
Publisher: Springer Netherlands
Published in: Meccanica / Issue 4/2014
Print ISSN: 0025-6455
Electronic ISSN: 1572-9648
DOI: https://doi.org/10.1007/s11012-013-9833-5

Springer Professional

Abstract

Please log in to get access to your license.

Dont have a licence yet? Then find out more about our products and how to get one now:

Springer Professional "Wirtschaft+Technik"

Springer Professional "Technik"

Other articles of this Issue 4/2014

Three-dimensional thermoelastic analysis of finite length laminated cylindrical panels with functionally graded layers

Analysis of curved beams using a new differential transformation based curved beam element

A new five-unknown refined theory based on neutral surface position for bending analysis of exponential graded plates

Configuration-dependent modal analysis of a Cartesian parallel kinematics manipulator: numerical modeling and experimental validation

The effect of crack size and specimen size on the relation between the Paris and Wöhler curves

Modeling and dynamics analysis of helical spring under compression using a curved beam element with consideration on contact between its coils

Premium Partners