Concurrent topology optimization for thermoelastic structures with random and interval hybrid uncertainties

Zheng, Jing; Ding, Shaonan; Jiang, Chao; Wang, Zhonghua

doi:10.1002/nme.6889

Cited by 9 publications

(5 citation statements)

References 54 publications

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“…20 The elastic matrix is interpolated as a whole in more recent papers. 10,28,33,35,52,53 Here, the temperature-dependent elastic matrix D(T) is fitted as:…”

Section: Polynomial Fitting Of Discrete Temperature-dependent Materia...mentioning

confidence: 99%

“…In fact, variations of Poisson's ratio can lead to significant changes in thermal stress 20 . The elastic matrix is interpolated as a whole in more recent papers 10,28,33,35,52,53 . Here, the temperature‐dependent elastic matrix D ( T ) is fitted as:

\mathbf{D}(T)=\sum \limits_{k=0}^{N^{(D)}-1}\kern.15em {\mathbf{C}}_k{T}^k,

where C k is the coefficient matrix and N ( D ) is the defined number of coefficient matrices.…”

Section: Thermo‐elastic Problems Under Large Temperature Gradientmentioning

confidence: 99%

“…24,25 Similar works were focused on the stress design for thermo-elastic problems. [26][27][28][29][30] Recently, complicated problems including geometrical nonlinearity, 31 uncertainty, 32,33 buckling, 34,35 and transient problems 36 have been addressed. The level-set method was also extended to deal with thermo-elastic problems and has become popular in the past five years.…”

Section: Introductionmentioning

confidence: 99%

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Topology optimization of thermo‐elastic structures with temperature‐dependent material properties under large temperature gradient

Tang

Gao

Zhang

et al. 2023

Numerical Meth Engineering

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In this work, high temperature and large temperature gradient are addressed for the first time in the topology optimization of thermo‐elastic structures. The conventional assumption of constant material properties (CMPs) is broken through with the full consideration of temperature‐dependent material properties (TDMPs) including thermal conductivity, elastic tensor, and coefficient of thermal expansion. Nonlinear heat conduction is thus implemented to give varying temperature fields in thermoelasticity. The maximum displacement of the specified region is taken as the objective function in the formulation of the optimization problem. The Kreisselmeier‐Steinhauser (KS) function is employed to approximate the regional maximum displacement/temperature. Corresponding sensitivity analyses, which are carried out using the adjoint method, theoretically reveal how TDMPs affect the thermo‐elastic optimization problem. Typical numerical examples are investigated to validate the proposed approach. The results show that the use of TDMPs produces optimized structures of high fidelity with displacements precisely predicted and temperature constraints rigorously satisfied under large temperature gradient, while thermo‐elastic analysis and optimization with CMPs lead to undesirable designs with significant inaccuracy.

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“…20 The elastic matrix is interpolated as a whole in more recent papers. 10,28,33,35,52,53 Here, the temperature-dependent elastic matrix D(T) is fitted as:…”

Section: Polynomial Fitting Of Discrete Temperature-dependent Materia...mentioning

confidence: 99%

\mathbf{D}(T)=\sum \limits_{k=0}^{N^{(D)}-1}\kern.15em {\mathbf{C}}_k{T}^k,

where C k is the coefficient matrix and N ( D ) is the defined number of coefficient matrices.…”

Section: Thermo‐elastic Problems Under Large Temperature Gradientmentioning

confidence: 99%

Section: Introductionmentioning

confidence: 99%

See 1 more Smart Citation

Topology optimization of thermo‐elastic structures with temperature‐dependent material properties under large temperature gradient

Tang

Gao

Zhang

et al. 2023

Numerical Meth Engineering

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“…76 Furthermore, multiscale thermo-elastic optimization was investigated. 77,78 Despite the fact that, numerical homogenization was also utilized to calculate the moisture diffusivity and hygral expansion coefficient, 79,80 yet hygro-elastic multiscale topology optimization is not yet investigated.…”

Section: Introductionmentioning

confidence: 99%

“…Moreover, some work was performed to extend the design problem to include heat conductivity extremum of the microscale structure as well as minimizing the microstructure's compliance 76 . Furthermore, multiscale thermo‐elastic optimization was investigated 77,78 . Despite the fact that, numerical homogenization was also utilized to calculate the moisture diffusivity and hygral expansion coefficient, 79,80 yet hygro‐elastic multiscale topology optimization is not yet investigated.…”

Section: Introductionmentioning

confidence: 99%

On concurrent multiscale topology optimization for porous structures under hygro‐thermo‐elastic multiphysics with considering evaporation

Ali

Shimoda

2023

Numerical Meth Engineering

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Lightweight polymeric and natural composite materials are extensively used in modern structures, especially with the demands for environmentally friendly products as well as lowering energy consumption. Furthermore, a high performance‐to‐weight ratio can be attained by utilizing porous composites. However, hygral and thermally induced loads are limiting the robustness of polymeric and natural composite materials, therefore; in this research, concurrent multiscale multiphysics topology optimization is used to design lightweight porous composite structures that have resilience toward mechanical as well as hygral and thermal loads. By establishing two independent representations of the design problem, that is, macro and microscale domains, a concurrent topology optimization framework is implemented, and the effective properties of the microscale (i.e., elastic, thermal conductivity, moisture diffusivity tensors, and hygral as well as thermal expansion coefficients) are calculated and used as the hygro‐thermo‐elastic properties of the macroscale using in‐house MATLAB codes. For hygral physics, moisture transport, as well as evaporation, are simultaneously considered in this study. A sensitivity analysis was conducted on the multiphysics concurrent optimization scheme in order to account for the coupling of macro and microstructure, as well as hygro‐thermo‐elastic physics. Multiple numerical cases were examined, which included different loading and boundary conditions, as well as various spatial configurations. The results showed attaining a high stiffness‐to‐weight ratio for the multiscale optimized porous structure compared to the single‐scale solid structure. Furthermore, a study was conducted on multiple microstructure subsystems to examine the impact of microstructure systems on macrostructure dependence. By combining several microstructures into a single macro design domain, design flexibility was enhanced and the performance‐to‐weight ratio was improved. The study was expanded to include the evaluation of hygro‐thermo‐elastic multiscale multiphysics with an evaporation problem, which was demonstrated through several numerical examples. The introduced formulations showed a successful application of the concurrent multiscale optimization formulations and good coupling on the macro and microscale. Also, the formulations demonstrated a strong influence between the macro and the microscale of the design problem for the topology optimization methods. The successful application of the concurrent multiscale optimization method in this research highlights its potential for designing more efficient and effective structures in the future.

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Multiscale concurrent topology optimization for thermoelastic structures under design-dependent varying temperature field

Guo,

Wang,

Wei

et al. 2023

Struct Multidisc Optim

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Concurrent topology optimization for thermoelastic structures with random and interval hybrid uncertainties

Cited by 9 publications

References 54 publications

Topology optimization of thermo‐elastic structures with temperature‐dependent material properties under large temperature gradient

Topology optimization of thermo‐elastic structures with temperature‐dependent material properties under large temperature gradient

On concurrent multiscale topology optimization for porous structures under hygro‐thermo‐elastic multiphysics with considering evaporation

Multiscale concurrent topology optimization for thermoelastic structures under design-dependent varying temperature field

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