Fourier Transform to Solve PDEs - 1D Heat Equation on Infinite Domain
Offered By: Steve Brunton via YouTube
Course Description
Overview
Explore the application of Fourier Transform in solving Partial Differential Equations (PDEs) with a focus on the 1D Heat Equation on an infinite domain. Delve into key concepts of Engineering Mathematics as presented in Lecture 19 of the ME565 course at the University of Washington. Learn about the Fourier Transform, its inverse, and their relevance in solving PDEs. Understand the physical properties associated with the 1D Heat Equation and how the Fourier Transform aids in its solution. Access comprehensive lecture notes and additional course resources to enhance your understanding of this advanced mathematical topic.
Syllabus
Introduction
Whiteboard
Fourier Transform
Inverse Fourier Transform
Physical Properties
Taught by
Steve Brunton
Related Courses
Differential Equations in ActionUdacity Dynamical Modeling Methods for Systems Biology
Icahn School of Medicine at Mount Sinai via Coursera An Introduction to Functional Analysis
École Centrale Paris via Coursera Practical Numerical Methods with Python
George Washington University via Independent The Finite Element Method for Problems in Physics
University of Michigan via Coursera