摘要
利用数值流形法具有统一解决连续和非连续问题的优势,进行了非线性稳态热传导问题分析。首次构建了基于NMM的非线性稳态热传导离散格式,并采用Newton-Raphson迭代算法对非线性方程组进行求解,从而实现了问题域内温度场和热流量场的精确计算。与有限元法相比,NMM在处理复杂边界条件和材料界面问题时展现出更强的适应性,其前处理过程也更为灵活便捷。为验证NMM的有效性,针对二维复杂边界和双层材料等问题域的热传导算例进行模拟,结果表明该方法具有较高的计算精度和良好的鲁棒性。
[Objective]This study addresses the numerical modeling of nonlinear steady-state heat conduction processes where the thermal conductivity varies with temperature.The governing equation for such problems is a second-order quasi-linear partial differential equation,whose nonlinear nature makes analytical solutions extremely challenging,thus necessitating efficient numerical approaches.This work employs the Numerical Manifold Method(NMM)based on quadrilateral mesh covers to analyze and solve two-dimensional nonlinear steady-state heat conduction problems.[Methods]Within the NMM over traditional methods framework,a discrete formulation suitable for nonlinear steady-state heat conduction was established by incorporating three typical boundary conditions:Dirichlet,Neumann,and Robin.The classical Newton-Raphson iterative algorithm was adopted to solve the resulting nonlinear system of equations.A complete numerical solution procedure was implemented on the MATLAB platform to ensure algorithm stability and computational efficiency.To systematically verify the accuracy and robustness of the proposed NMM in handling nonlinear heat conduction,a series of representative numerical examples were designed and conducted.These examples covered various scenarios,including continuous homogeneous materials,discontinuous media containing circular holes,and heterogeneous materials.The simulation results were compared against analytical solutions,existing literature data,or Finite Element Method(FEM)solutions.[Results]1)Compared to the traditional Finite Element Method(FEM),NMM demonstrates significant theoretical and practical advantages when simulating problem domains with complex geometries or internal discontinuities.This advantage primarily stems from its distinctive numerical characteristics:in NMM,the interpolation subdomains are independent of the subdomains used for numerical integration,whereas in FEM they coincide entirely on the same mesh.Furthermore,FEM is prone to mesh distortion when handling complex boundaries,which can degrade accuracy and impair computational efficiency.Leveraging its physical cover system,NMM can accurately describe complex geometric boundaries.At material interfaces,the different heat conduction behaviors across materials are naturally captured through physical covers and local functions without introducing additional interface conditions,thereby simplifying the computational process and enhancing efficiency.2)The proposed NMM not only achieves high accuracy in temperature field and heat flux distribution across all examples but also exhibits excellent stability and convergence when dealing with discontinuous interfaces and complex geometries,fully validating the method’s effectiveness and reliability for nonlinear steady-state heat conduction problems.[Conclusion]This study successfully applies NMM to solve two-dimensional nonlinear steady-state heat conduction problems.Through comprehensive comparative analysis and numerical validation,the unique advantages of this method in handling complex engineering thermal problems are highlighted.It provides a novel solution for the numerical simulation of nonlinear heat conduction problems and extends the application scope of NMM in the field of computational thermal physics.
作者
张丽美
殷跃平
郑宏
朱赛楠
魏云杰
张楠
杨龙
ZHANG Li-mei;YIN Yue-ping;ZHENG Hong;ZHU Sai-nan;WEI Yun-jie;ZHANG Nan;YANG Long(China Institute of Geological Environment Monitoring,Beijing 100081,China;College of Engineering and Technology,China University of Geosciences(Beijing),Beijing 100083,China;Department of Urban Construction,Beijing University of Technology,Beijing 100124,China)
出处
《长江科学院院报》
北大核心
2026年第2期181-191,共11页
Journal of Changjiang River Scientific Research Institute
基金
四川省科技厅项目(N5100012024000900)
云南省重点研发计划项目(202403AA08001)。
