Parameter identification problems for elastic large deformations - Part II: numerical solution and results

Meyer, Marcus

20 November 2009

In this paper we continue the considerations of [5] (CSC/09-05). A numerical study for the parameter identification problem with linear elastic material and large deformations is presented. We discuss the numerical implementation in MATLAB and illustrate some results for a 2D test problem.

identification problem

large elastic deformations

material laws

ddc:510

Finite-Elemente-Methode

Inverses Problem

Parameter identification problems for elastic large deformations - Part I: model and solution of the inverse problem

Meyer, Marcus

20 November 2009

In this paper we discuss the identification of parameter functions in material models for elastic large deformations. A model of the the forward problem is given, where the displacement of a deformed material is found as the solution of a n onlinear PDE. Here, the crucial point is the definition of the 2nd Piola-Kirchhoff stress tensor by using several material laws including a number of material parameters. In the main part of the paper we consider the identification of such parameters from measured displacements, where the inverse problem is given as an optimal control problem. We introduce a solution of the identification problem with Lagrange and SQP methods. The presented algorithm is applied to linear elastic material with large deformations.

identification problem

large elastic deformations

material laws

nonlinear inverse problem

sequential quadratic programming

ddc:510

Inverses Problem

Parameter identification problems for elastic large deformations - Part II: numerical solution and results

Meyer, Marcus

20 November 2009

In this paper we continue the considerations of [5] (CSC/09-05). A numerical study for the parameter identification problem with linear elastic material and large deformations is presented. We discuss the numerical implementation in MATLAB and illustrate some results for a 2D test problem.

info:eu-repo/classification/ddc/510

ddc:510

Finite-Elemente-Methode

Inverses Problem

identification problem

large elastic deformations

material laws

Parameter identification problems for elastic large deformations - Part I: model and solution of the inverse problem

Meyer, Marcus

20 November 2009

In this paper we discuss the identification of parameter functions in material models for elastic large deformations. A model of the the forward problem is given, where the displacement of a deformed material is found as the solution of a n onlinear PDE. Here, the crucial point is the definition of the 2nd Piola-Kirchhoff stress tensor by using several material laws including a number of material parameters. In the main part of the paper we consider the identification of such parameters from measured displacements, where the inverse problem is given as an optimal control problem. We introduce a solution of the identification problem with Lagrange and SQP methods. The presented algorithm is applied to linear elastic material with large deformations.

info:eu-repo/classification/ddc/510

ddc:510

Inverses Problem

identification problem

large elastic deformations

material laws

nonlinear inverse problem

sequential quadratic programming