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A distribution is a continuous linear functional on the space $\mathcal{C}^{\infty}_c$ of smooth (indefinitely differentiable) functions with compact support. Though they appeared in formal computations in the physics and engineering literature in the late $19^{th}$ century, their formal setting was brought up by the work of S. Sobolev and L. Schwartz in the middle of the $20^{th}$ century.

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Distributions as derivatives

This is perhaps tangential to your query but I am posting it in the hope that it might contain useful information. I will start with the case of distributions on a compact interval, which we can assu …
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1 vote

Given a compact set $K \subset \mathbb{R}^n$, is the space of distributions supported on $K$...

The short answer to your question is yes. There is such a space, that of the locally smooth functions on $K$. Let us recall that Schwartz defined the space of distributions with support in $K$ not di …
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1 vote

Delta-distribution composed with a function from the Fourier representation

The point of this coda to the above answers is to document the fact that it is possible to address this topic in a perfectly rigorous and elementary fashion. Let me start with the remarks that there …
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1 vote

What do we know about the space of finite order distributions ?

The following are some night thoughts on finite order distributions which might be of interest since this topic is a rich source of fruitful questions on the relations between abstract functional anal …
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3 votes

Fourier transform of periodic distributions

This is a comment rather than an answer but it will be too long. There is a confusion in your statement which I find rather irritating and which has not, as far as I can see, been addressed here. I …
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