Distributions - Convolution and Fourier transform

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Distributions - Convolution and Fourier transform

Author : Michel DOISY

Publication date: April 10, 2005, Review date: April 26, 2021 | Lire en français

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AUTHOR

  • Michel DOISY : Senior lecturer in mathematics École nationale supérieure d'électrotechnique, d'électronique, d'informatique, d'hydraulique et des télécommunications (ENSEEIHT) Institut national polytechnique de Toulouse

 INTRODUCTION

In the first article , we introduced the main operations on distributions and discussed the fundamental notion of the derivative of a distribution.

This second article deals more specifically with the convolution product of distributions and their Fourier transform.

Used together, the convolution product and the Fourier transform are two very effective tools for solving certain differential equations. For example, solve :

1ω2g+g=f

Formally, and using the properties of the convolution product and the Fourier transform , we can write :

1ω2(2iπt)2g^(t)+g^(t)=f^(t)

or :

g^(t)[1+4 π2t2ω2]=f^(t)

As the function [1+4 π2

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