Topology optimization at finite strain setting using the concept of inverse motion based form finding is introduced. This novel procedure allows boundary conditions and shape of the structure in the operating, deformed, state to be prescribed. The outcome of the optimization algorithm will be the shape of the undeformed structure, i.e. the state in which the structure should be manufactured. The objective of the optimization considered is to find the stiffest structure for a given amount of material. The problem is regularized using a Helmholtz filter which is formulated in the deformed configuration. Both the elastic boundary value problem and the partial differential equation associated with the Helmholtz filter are solved using the finit...
Topology optimization of continuum structures is a relatively new branch of the structural opti-miza...
We deal with an optimal control problem governed by a nonlinear boundary value problem in elastostat...
Optimization of structural topology, called briefly: topology optimization, is a relatively new bran...
Topology optimization at finite strain setting using the concept of inverse motion based form findin...
The inverse motion concept is used to optimize thermo-hyperelastic structures using an exact descrip...
In this paper the topology optimization problem is solved in a finite strain setting using a polycon...
In this paper infinitesimal elasto-plastic based topology optimization is extended to finite strains...
This work addresses the treatment of lower density regions of structures undergoing large deformatio...
Optimization based on traditional forward motion analysis to ensure a prescribed load distribution o...
The technological competition has demanded an ever increasing technological development, and in e.g....
Strain energy based topology optimization method has been used since topology optimization method wa...
Our contribution consists of three parts: a gradient-based parameter-free shape optimization method;...
Optimal geometries extracted from traditional element-based topology optimization outcomes usually h...
This paper discusses a structural optimization method that optimizes shape and topology based on the...
This paper incorporates hyperelastic materials, nonlinear kinematics, and preloads in eigenfrequency...
Topology optimization of continuum structures is a relatively new branch of the structural opti-miza...
We deal with an optimal control problem governed by a nonlinear boundary value problem in elastostat...
Optimization of structural topology, called briefly: topology optimization, is a relatively new bran...
Topology optimization at finite strain setting using the concept of inverse motion based form findin...
The inverse motion concept is used to optimize thermo-hyperelastic structures using an exact descrip...
In this paper the topology optimization problem is solved in a finite strain setting using a polycon...
In this paper infinitesimal elasto-plastic based topology optimization is extended to finite strains...
This work addresses the treatment of lower density regions of structures undergoing large deformatio...
Optimization based on traditional forward motion analysis to ensure a prescribed load distribution o...
The technological competition has demanded an ever increasing technological development, and in e.g....
Strain energy based topology optimization method has been used since topology optimization method wa...
Our contribution consists of three parts: a gradient-based parameter-free shape optimization method;...
Optimal geometries extracted from traditional element-based topology optimization outcomes usually h...
This paper discusses a structural optimization method that optimizes shape and topology based on the...
This paper incorporates hyperelastic materials, nonlinear kinematics, and preloads in eigenfrequency...
Topology optimization of continuum structures is a relatively new branch of the structural opti-miza...
We deal with an optimal control problem governed by a nonlinear boundary value problem in elastostat...
Optimization of structural topology, called briefly: topology optimization, is a relatively new bran...