Investigation of Using High-Order Discontinuous Galerkin Methods in Adjoint Gradient-Based 3D Aerodynamic Shape Optimization

IF 2.9 3区工程技术 Q1 ENGINEERING, MULTIDISCIPLINARY International Journal for Numerical Methods in Engineering Pub Date : 2025-04-21 DOI:10.1002/nme.70033

Yiwei Feng, Lili Lv, Tiegang Liu, Kun Wang, Bangcheng Ai

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Abstract

Based on recent work by He et al. (Computer Physics Communications 286 (2023): 108660), this work develops a robust and efficient workflow for 3D aerodynamic shape optimization (ASO) based on the discontinuous Galerkin method (DGM) with solution remapping technique. It is theoretically found and numerically validated through 2D cases that the DGMs can provide more precise adjoint-enabled gradients even on a coarse mesh as compared with the FVMs under coequal computational costs. A number of 2D and 3D intricate cases are tested to illustrate the potential advantages of the DGM-based ASO workflow in terms of computational efficiency and final optimization results. The results demonstrate that the solution remapping technique can save around $50 %$ of the computational time. Moreover, the DGM-based workflow extends the capability to explore the design space, leading to aerodynamic shapes with superior performance.

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基于梯度的三维空气动力学形状优化中使用高阶非连续伽勒金方法的研究

基于He等人最近的工作（计算机物理通信286(2023):108660），本工作基于带有解重映射技术的不连续伽辽金方法（DGM）开发了一个鲁棒高效的三维气动形状优化（ASO）工作流。理论发现和2D算例的数值验证表明，在计算成本相等的情况下，与fvm相比，dgm可以在粗糙网格上提供更精确的伴随梯度。通过对2D和3D复杂案例的测试，验证了基于dgm的ASO工作流在计算效率和最终优化结果方面的潜在优势。结果表明，解映射技术可以节省约50 % $$ 50\% $$ of the computational time. Moreover, the DGM-based workflow extends the capability to explore the design space, leading to aerodynamic shapes with superior performance.

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来源期刊

International Journal for Numerical Methods in Engineering 工程技术-工程：综合

CiteScore

5.70

自引率

6.90%

发文量

276

审稿时长

5.3 months

期刊介绍： The International Journal for Numerical Methods in Engineering publishes original papers describing significant, novel developments in numerical methods that are applicable to engineering problems. The Journal is known for welcoming contributions in a wide range of areas in computational engineering, including computational issues in model reduction, uncertainty quantification, verification and validation, inverse analysis and stochastic methods, optimisation, element technology, solution techniques and parallel computing, damage and fracture, mechanics at micro and nano-scales, low-speed fluid dynamics, fluid-structure interaction, electromagnetics, coupled diffusion phenomena, and error estimation and mesh generation. It is emphasized that this is by no means an exhaustive list, and particularly papers on multi-scale, multi-physics or multi-disciplinary problems, and on new, emerging topics are welcome.