Derivation of 1D Heat PDE and solution via Finite Difference Method
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Updated
Nov 28, 2023 - Jupyter Notebook
Derivation of 1D Heat PDE and solution via Finite Difference Method
Work of Fourier
Generates an "optimal" heatsink-profile assuming laminar airflow
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Heat equation solution with finite element method on uniform and random unidimensional mesh
1D Heat Conduction Equation with custom user input using analytical solutions
Heat Equation solver C++. Solves heat equation (One-dimensional case)
Here we solved 2-d Thermal diffusion equation with periodic boundary conditions.
This project is prepared as part of CA course and it contains solution of heat equation with simple explicit method and Laasonen’s simple implicit method.
Implementation of numerical solutions to PDES: Closest Point Method and Finite Difference Method
Two solutions, written in MATLAB, for solving the viscous Burger's equation. They are both spectral methods: the first is a Fourier Galerkin method, and the second is Collocation on the Tchebyshev-Gauß-Lobatto points.
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