Structural topology optimization of multibody systems
Journal article, 2017

© 2016 The Author(s)Flexible multibody dynamics (FMD) has found many applications in control, analysis and design of mechanical systems. FMD together with the theory of structural optimization can be used for designing multibody systems with bodies which are lighter, but stronger. Topology optimization of static structures is an active research topic in structural mechanics. However, the extension to the dynamic case is less investigated as one has to face serious numerical difficulties. One way of extending static structural topology optimization to topology optimization of dynamic flexible multibody system with large rotational and transitional motion is investigated in this paper. The optimization can be performed simultaneously on all flexible bodies. The simulation part of optimization is based on an FEM approach together with modal reduction. The resulting nonlinear differential-algebraic systems are solved with the error controlled integrator IDA (Sundials) wrapped into Python environment by Assimulo (Andersson et al. in Math. Comput. Simul. 116(0):26–43, 2015). A modified formulation of solid isotropic material with penalization (SIMP) method is suggested to avoid numerical instabilities and convergence failures of the optimizer. Sensitivity analysis is central in structural optimization. The sensitivities are approximated to circumvent the expensive calculations. The provided examples show that the method is indeed suitable for optimizing a wide range of multibody systems. Standard SIMP method in structural topology optimization suggests stiffness penalization. To overcome the problem of instabilities and mesh distortion in the dynamic case we consider here additionally element mass penalization.

Transient response

Structural topology optimization

Flexible multibody dynamics

SIMP

Author

Toheed Ghandriz

Chalmers, Applied Mechanics, Vehicle Engineering and Autonomous Systems

Claus Führer

Lund University

Hilding Elmqvist

Dassault Systemes

Multibody System Dynamics

1384-5640 (ISSN) 1573-272X (eISSN)

Vol. 39 1-2 1-14

Subject Categories

Mechanical Engineering

Driving Forces

Sustainable development

Areas of Advance

Transport

Building Futures (2010-2018)

Production

Learning and teaching

Pedagogical work

DOI

10.1007/s11044-016-9542-7

More information

Latest update

11/7/2022