Plastic work constrained elastoplastic topology optimization

Niklas Ivarsson; Mathias Wallin; Oded Amir; Daniel A. Tortorelli

doi:10.1002/nme.6706

Plastic work constrained elastoplastic topology optimization

Niklas Ivarsson, Mathias Wallin, Oded Amir, Daniel A. Tortorelli

Research output: Contribution to journal › Article › peer-review

Abstract

An elastoplastic topology optimization framework for limiting plastic work generation while maximizing stiffness is presented. The kinematics and constitutive model are based on finite strain linear isotropic hardening plasticity, and the balance laws are solved using a total Lagrangian finite element formulation. Aggregation of the specific plastic work combined with an adaptive normalization scheme efficiently constrains the maximum specific plastic work. The optimization problem is regularized using an augmented partial differential equation filter, and is solved by the method of moving asymptotes where path-dependent sensitivities are derived using the adjoint method. The numerical examples show a clear dependence on the optimized maximum stiffness structures for different levels of constrained specific plastic work. It is also shown that due to the history dependency of the plasticity, the load path significantly influences the structural performance and optimized topology.

Original language	English
Pages (from-to)	4354-4377
Journal	International Journal for Numerical Methods in Engineering
Volume	122
Issue number	16
Early online date	2021 Apr 26
DOIs	https://doi.org/10.1002/nme.6706
Publication status	Published - 2021

Bibliographical note

Funding Information:
This work was performed under the auspices of the U.S. Department of Energy by Lawrence Livermore National Laboratory under Contract DE‐AC52‐07NA33344. The computations were enabled by resources provided by the Swedish National Infrastructure for Computing (SNIC) at Lund University partially funded by the Swedish Research Council through grant agreement no. 2018‐05973. MW and NI are grateful for the financial support provided by the Swedish energy agency, grant number 48344‐1, and the Swedish strategic research programme eSSENCE. OA is grateful for the financial support from the Israeli Science Foundation, grant number 750/15. The authors would finally like to thank Prof. Krister Svanberg for providing the MMA code.

Subject classification (UKÄ)

Applied Mechanics

Free keywords

discrete adjoint sensitivity analysis
plastic work
stiffness maximization
topology optimization

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10.1002/nme.6706Licence: CC BY

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title = "Plastic work constrained elastoplastic topology optimization",

abstract = "An elastoplastic topology optimization framework for limiting plastic work generation while maximizing stiffness is presented. The kinematics and constitutive model are based on finite strain linear isotropic hardening plasticity, and the balance laws are solved using a total Lagrangian finite element formulation. Aggregation of the specific plastic work combined with an adaptive normalization scheme efficiently constrains the maximum specific plastic work. The optimization problem is regularized using an augmented partial differential equation filter, and is solved by the method of moving asymptotes where path-dependent sensitivities are derived using the adjoint method. The numerical examples show a clear dependence on the optimized maximum stiffness structures for different levels of constrained specific plastic work. It is also shown that due to the history dependency of the plasticity, the load path significantly influences the structural performance and optimized topology.",

keywords = "discrete adjoint sensitivity analysis, plastic work, stiffness maximization, topology optimization",

author = "Niklas Ivarsson and Mathias Wallin and Oded Amir and Tortorelli, {Daniel A.}",

note = "Funding Information: This work was performed under the auspices of the U.S. Department of Energy by Lawrence Livermore National Laboratory under Contract DE‐AC52‐07NA33344. The computations were enabled by resources provided by the Swedish National Infrastructure for Computing (SNIC) at Lund University partially funded by the Swedish Research Council through grant agreement no. 2018‐05973. MW and NI are grateful for the financial support provided by the Swedish energy agency, grant number 48344‐1, and the Swedish strategic research programme eSSENCE. OA is grateful for the financial support from the Israeli Science Foundation, grant number 750/15. The authors would finally like to thank Prof. Krister Svanberg for providing the MMA code. ",

year = "2021",

doi = "10.1002/nme.6706",

language = "English",

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AU - Amir, Oded

AU - Tortorelli, Daniel A.

N1 - Funding Information: This work was performed under the auspices of the U.S. Department of Energy by Lawrence Livermore National Laboratory under Contract DE‐AC52‐07NA33344. The computations were enabled by resources provided by the Swedish National Infrastructure for Computing (SNIC) at Lund University partially funded by the Swedish Research Council through grant agreement no. 2018‐05973. MW and NI are grateful for the financial support provided by the Swedish energy agency, grant number 48344‐1, and the Swedish strategic research programme eSSENCE. OA is grateful for the financial support from the Israeli Science Foundation, grant number 750/15. The authors would finally like to thank Prof. Krister Svanberg for providing the MMA code.

PY - 2021

Y1 - 2021

N2 - An elastoplastic topology optimization framework for limiting plastic work generation while maximizing stiffness is presented. The kinematics and constitutive model are based on finite strain linear isotropic hardening plasticity, and the balance laws are solved using a total Lagrangian finite element formulation. Aggregation of the specific plastic work combined with an adaptive normalization scheme efficiently constrains the maximum specific plastic work. The optimization problem is regularized using an augmented partial differential equation filter, and is solved by the method of moving asymptotes where path-dependent sensitivities are derived using the adjoint method. The numerical examples show a clear dependence on the optimized maximum stiffness structures for different levels of constrained specific plastic work. It is also shown that due to the history dependency of the plasticity, the load path significantly influences the structural performance and optimized topology.

AB - An elastoplastic topology optimization framework for limiting plastic work generation while maximizing stiffness is presented. The kinematics and constitutive model are based on finite strain linear isotropic hardening plasticity, and the balance laws are solved using a total Lagrangian finite element formulation. Aggregation of the specific plastic work combined with an adaptive normalization scheme efficiently constrains the maximum specific plastic work. The optimization problem is regularized using an augmented partial differential equation filter, and is solved by the method of moving asymptotes where path-dependent sensitivities are derived using the adjoint method. The numerical examples show a clear dependence on the optimized maximum stiffness structures for different levels of constrained specific plastic work. It is also shown that due to the history dependency of the plasticity, the load path significantly influences the structural performance and optimized topology.

KW - discrete adjoint sensitivity analysis

KW - plastic work

KW - stiffness maximization

KW - topology optimization

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Plastic work constrained elastoplastic topology optimization

Abstract

Bibliographical note

Subject classification (UKÄ)

Free keywords

Access to Document

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Topology optimization of non-linear, dissipative structures and materials

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