Discretization of PDE Problems Using Symbolic Techniques

Maplesoft

Partial differential equations (PDEs) are used to describe a wide variety of phenomena such as sound, heat, electrostatic, electrodynamics, elasticity, fluid flow, etc., and solving them is a critical step to better understanding the behaviors of a physical process. In this webinar you will learn how to define a PDE as a process in Maple’s symbolic environment and solve it using different techniques, namely finite difference method, collocation method, and Galerkin’s technique.

This presentation will also demonstrate, through the use of examples and case studies, the advanced symbolic mathematics techniques for several technical problems including heat transfer and high-fidelity battery design. The presentation also shows the integration between Maple and MapleSim to create high-fidelity multi-domain models of physical systems based on the results from solving PDEs in Maple.
Language: English
Duration: 49 Minutes
Related Terms: Partial_differential_equations, Symbolic

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Discretization of PDE Problems Using Symbolic Techniques

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