A Lagrangian formulation of the dynamic model for flexible manipulator systems

Low, K. H. ; Vidyasagar, M. (1988) A Lagrangian formulation of the dynamic model for flexible manipulator systems Journal of Dynamic Systems, Measurement, and Control, 110 (2). pp. 175-181. ISSN 0022-0434

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Related URL: http://dx.doi.org/10.1115/1.3152668

Abstract

This paper presents a procedure for deriving dynamic equations for manipulators containing both rigid and flexible links. The equations are derived using Hamilton's principle, and are nonlinear integro-differential equations. The formulation is based on expressing the kinetic and potential energies of the manipulator system in terms of generalized coordinates. In the case of flexible links, the mass distribution and flexibility are taken into account. The approach is a natural extension of the well-known Lagrangian method for rigid manipulators. Properties of the dynamic matrices, which lead to a less computation, are shown. Boundary-value problems of continuous systems are briefly described. A two-link manipulator with one rigid link and one flexible link is analyzed to illustrate the procedure.

Item Type:Article
Source:Copyright of this article belongs to The American Society of Mechanical Engineers.
ID Code:56901
Deposited On:25 Aug 2011 09:32
Last Modified:25 Aug 2011 09:32

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