A method for solving 2D nonlinear partial differential equations exemplified by the heat-diffusion equation

Will Waldron

doi:10.1117/12.2513623

19 June 2019 A method for solving 2D nonlinear partial differential equations exemplified by the heat-diffusion equation

Will Waldron

Author Affiliations +

Proceedings Volume 11001, Infrared Imaging Systems: Design, Analysis, Modeling, and Testing XXX; 110010S (2019) https://doi.org/10.1117/12.2513623
Event: SPIE Defense + Commercial Sensing, 2019, Baltimore, MD, United States

Abstract

This paper explores a technique to solve nonlinear partial differential equations (PDEs) using finite differences. This method is intended for higher fidelity analysis than first-order equations and quicker analysis than finite element analysis (FEA). The set of finite difference equations are linearized using Newton's Method to find an optimal solution. Throughout the paper, the Heat-Diffusion Equation is used as an example of method implementation. The results from using this method were checked against a simple program written in a graduate Computational Physics class and a NASTRAN case. Overall, the methodology in this paper produced results that matched NASTRAN and the simple case well.

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Will Waldron "A method for solving 2D nonlinear partial differential equations exemplified by the heat-diffusion equation", Proc. SPIE 11001, Infrared Imaging Systems: Design, Analysis, Modeling, and Testing XXX, 110010S (19 June 2019); https://doi.org/10.1117/12.2513623

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