Investigation of Analysis and Gradient-Based Design Optimization Using Neural Networks

K. Fuchi, Eric M. Wolf, D. Makhija, Nathan A. Wukie, Christopher R. Schrock, P. Beran
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引用次数: 2

Abstract

Design optimization of adaptive systems requires a robust analysis method that can accommodate various changes in design and boundary conditions. In this work, physics-informed neural networks (PINNs) are used to approximate solutions to differential equations across a range of problem parameter values. This mesh-free method simply requires residual evaluation at sampling points within the analysis domain and along boundaries, and the training process does not require any reference problem to be solved through conventional solution methods. The trained model can be used to predict the solution field, conduct parameter space analysis and design optimization. Using automatic differentiation, the design objective and their derivatives can be computed as a post process for a gradient-based design optimization. The method is demonstrated in a 1D heat transfer problem governed by the steady-state heat equation. Use of the PINN model for design optimization is illustrated in a problem of finding a material transition location to minimize temperature at a specified location. The PINN model that does not include problem parameters as input can be trained to within 0.05% error. PINN models that involve problem parameters as inputs are more difficult to train, especially when the input-to-output relationship is complex.
基于神经网络的分析与梯度设计优化研究
自适应系统的优化设计需要一种稳健的分析方法,能够适应设计和边界条件的各种变化。在这项工作中,物理信息神经网络(pinn)用于在一系列问题参数值上近似微分方程的解。这种无网格方法只需要在分析域内和沿边界的采样点处进行残差评估,并且训练过程不需要通过常规求解方法求解任何参考问题。训练后的模型可用于预测解域,进行参数空间分析和设计优化。利用自动微分,设计目标及其导数可以作为基于梯度的设计优化的后处理进行计算。以一维稳态热方程传热问题为例验证了该方法的有效性。利用PINN模型进行设计优化,说明了一个问题,找到一个材料的过渡位置,以最小化温度在一个指定的位置。不包含问题参数作为输入的PINN模型可以被训练到误差在0.05%以内。将问题参数作为输入的PINN模型更难训练,特别是当输入输出关系很复杂时。
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