Stress stiffening and approximate equations in flexible multibody dynamics
Abstract
A useful model for open chains of flexible bodies undergoing large rigid body motions, but small elastic deformations, is one in which the equations of motion are linearized in the small elastic deformations and deformation rates. For slow rigid body motions, the correctly linearized, or consistent, set of equations can be compared to prematurely linearized, or inconsistent, equations and to 'oversimplified,' or ruthless, equations through the use of open loop dynamic simulations. It has been shown that the inconsistent model should never be used, while the ruthless model should be used whenever possible. The consistent and inconsistent models differ by stress stiffening terms. These are due to zeroth-order stresses effecting virtual work via nonlinear strain-displacement terms. In this paper we examine in detail the nature of these stress stiffening terms and conclude that they are significant only when the associated zeroth-order stresses approach 'buckling' stresses. Finally it is emphasized that when the stress stiffening terms are negligible the ruthlessly linearized equations should be used.
- Publication:
-
Aerospace Computational Control Workshop
- Pub Date:
- February 1993
- Bibcode:
- 1993acc..work...25P
- Keywords:
-
- Body Kinematics;
- Dynamic Models;
- Dynamic Structural Analysis;
- Elastic Deformation;
- Flexible Bodies;
- Nonlinearity;
- Stress Analysis;
- Computerized Simulation;
- Elastic Buckling;
- Equations Of Motion;
- Rigid Structures;
- Stiffening;
- Structural Mechanics