Reduced order framework for convection dominant and pure diffusive problems based on combination of deep long short‐term memory and proper orthogonal decomposition/dynamic mode decomposition methods

Kherad, Mahdi; Moayyedi, Mohammad Kazem; Fotouhi, Faranak

doi:10.1002/fld.4911

Cited by 12 publications

(11 citation statements)

References 51 publications

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“…For example, the model reduction algorithm retains the main features of the solution state vector. Well-known methods for constructing reduced-order models (ROMs) include proper orthogonal decomposition (POD) [20][21][22], Koopman analysis [23] and dynamic mode decomposition [24][25][26][27].…”

Section: Introductionmentioning

confidence: 99%

Propulsion optimization of a jellyfish-inspired robot based on a nonintrusive reduced-order model with proper orthogonal decomposition

Ying¹,

Zhang²,

Wang³

et al. 2022

Bioinspir. Biomim.

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In this research, the propulsion of the proposed jellyfish-inspired mantle undulated propulsion robot (MUPRo) is optimized. To reliably predict the hydrodynamic forces acting on the robot, the proposed non-intrusive reduced-order model (NIROM) based on proper orthogonal decomposition (POD) additionally considers the POD basis that has an important contribution to the features on the specified boundary. The proposed model establishes a mapping between the parameter-driven motion of the mantle and the evolution of the fluid characteristics around the swimmer. Moreover, to predict new cases where the input needs to be updated, the input of the proposed model is taken from the kinematics of the robot rather than extracted from full-order high-fidelity models. In this paper, it takes approximately 950s to perform a simulation using the full-order high-fidelity model. However, the computational cost for one prediction with the proposed POD-NIROM is around 0.54s, of which about 0.2s is contributed by preprocessing. Compared with the NIROM based on the classic POD method, the proposed POD-NIROM can effectively update the input and reasonably predict the characteristics on the boundary. The analysis of the hydrodynamic performance of the MUPRo pinpoints that, under a certain period and a certain undulation amplitude, the hydrodynamic force generated by swinging-like mantle motion (k<0.5) is greater, outperforming Aequorea victoria in startup acceleration. It is demonstrated that considering a certain power loss and a certain tail beat amplitude, the wave-like mantle motion (k>0.5) can produce greater propulsion, which means higher propulsion efficiency.

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Section: Introductionmentioning

confidence: 99%

Propulsion optimization of a jellyfish-inspired robot based on a nonintrusive reduced-order model with proper orthogonal decomposition

Ying¹,

Zhang²,

Wang³

et al. 2022

Bioinspir. Biomim.

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“…For the latter, reduced governing equations are replaced by a machine learning algorithm, for example, the radial basis function (RBF) 20,23,24 or the long−short-term memory (LSTM) neural network. 25,26 Up to now, most applications of the POD-based ROM have been concentrated in Eulerian simulations (e.g., refs 23,24). However, due to the complicated motion of solid particles, only a few studies explored POD's applications to Lagrangian systems.…”

Section: Introductionmentioning

confidence: 99%

“…In the nonintrusive ROM, Wu and Schaback derived the error bounds in the RBF interpolation method. Consistency error. In the ROM, a key underlying assumption is that the dominant POD modes in the training and testing data sets are essentially similar . When this assumption does not hold exactly, the inconsistent training problem for the testing data set would occur, thus triggering the consistency error.…”

Section: Introductionmentioning

confidence: 99%

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Feasibility Analysis of a POD-Based Reduced Order Model with Application in Eulerian–Lagrangian Simulations

Duan,

Li,

Sakai

2023

Ind. Eng. Chem. Res.

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Computational fluid dynamics coupled with the discrete element method (CFD-DEM) is widely employed for simulating multiphase flows involving particles, but the heavy computational cost is a major concern. Reduced order models (ROMs) based on proper orthogonal decomposition (POD) offer new potential to greatly reduce the computational cost. This study aims to investigate the feasibility of POD-based ROMs for Eulerian−Lagrangian simulations, considering the few studies in this field. For feasibility analysis, whether the dominant POD modes are essentially similar between the training and testing data sets is a crucial condition. If this condition is not perfectly met, an inconsistent training problem easily takes place, resulting in a so-called consistency error. This error could deteriorate the predictability of a POD-based ROM. Based on a theoretical analysis of consistency error, the most accurate solution that POD-based ROMs can produce is obtained. Furthermore, not only a new common POD-mode number between the training and testing data sets but also a novel predictability ratio are proposed for general feasibility analysis. The simulations of fluidized and spouted beds are taken as examples to show the application of the feasibility analysis. It is found that the POD-based ROM shows poor and excellent predictability for Lagrangian and Eulerian variables, respectively. Thus, it is suggested to map Lagrangian variables in DEM simulations on fixed Eulerian meshes to improve the predictability of the solid particle behavior in the POD-based ROM.

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“…With the rapid development of machine learning technology in recent years, remarkable breakthroughs have been made in speech recognition, computer vision and other fields. Inspired by this, researchers having been attempting to apply artificial intelligence (AI) to fluid mechanics, such as flow fields reconstruction, [3][4][5] aerodynamic force prediction, 6 and reduced-order models. [7][8][9] Machine learning has also been used for aerodynamic prediction and optimization of turbine rotor, 10 aerodynamic design, robustness optimization 11,12 and prediction of pressure distribution of airfoils.…”

Section: Introductionmentioning

confidence: 99%

Research on grid‐dependence of neural network turbulence model

Song

Zhang

Sun

et al. 2022

Numerical Methods in Fluids

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Turbulence machine learning based on deep neural network has become a research hotspot in turbulence modeling. Although most turbulence models have strict requirements on grid dependence, there are few analyses on grid dependence on the coupling of models and equations. In this article, a neural network turbulence model is constructed for the flow around airfoil with high Reynolds number, and the effects of wall‐normal grid spacing on the calculation accuracy are studied. The results show that compared with the traditional differential equation turbulence model, the neural network turbulence model can break through the limitation of y+ < 1 and relax the requirement of the normal density of the boundary layer grid while ensuring the accuracy.

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Reduced order framework for convection dominant and pure diffusive problems based on combination of deep long short‐term memory and proper orthogonal decomposition/dynamic mode decomposition methods

Cited by 12 publications

References 51 publications

Propulsion optimization of a jellyfish-inspired robot based on a nonintrusive reduced-order model with proper orthogonal decomposition

Propulsion optimization of a jellyfish-inspired robot based on a nonintrusive reduced-order model with proper orthogonal decomposition

Feasibility Analysis of a POD-Based Reduced Order Model with Application in Eulerian–Lagrangian Simulations

Research on grid‐dependence of neural network turbulence model

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