http://www.bing.com:80/search?q=Convolution+ExercisesSearch resultshttp://www.bing.com:80/s/a/rsslogo.gifhttp://www.bing.com:80/search?q=Convolution+ExercisesCopyright © 2026 Microsoft. All rights reserved. These XML results may not be used, reproduced or transmitted in any manner or for any purpose other than rendering Bing results within an RSS aggregator for your personal, non-commercial use. Any other use of these results requires express written permission from Microsoft Corporation. By accessing this web page or using these results in any manner whatsoever, you agree to be bound by the foregoing restrictions.https://math.stackexchange.com/questions/7413/meaning-of-convolutionI am currently learning about the concept of convolution between two functions in my university course. The course notes are vague about what convolution is, so I was wondering if anyone could giv...Fri, 10 Apr 2026 04:32:00 GMThttps://math.stackexchange.com/questions/714507/definition-of-convolutionI agree that the algebraic rule for computing the coefficients of the product of two power series and convolution are very similar. Based on your connection, it seems to me that convolution therefore defines a different "natural multiplication" between functions if we consider functions $\mathbb {R} \to \mathbb {R}$ as generalized power series ...Sat, 04 Apr 2026 08:42:00 GMThttps://math.stackexchange.com/questions/1423817/what-is-convolution3 The definition of convolution is known as the integral of the product of two functions $$ (f*g) (t)\int_ {-\infty}^ {\infty} f (t -\tau)g (\tau)\,\mathrm d\tau$$ But what does the product of the functions give? Why are is it being integrated on negative infinity to infinity? What is the physical significance of the convolution?Mon, 06 Apr 2026 23:27:00 GMThttps://math.stackexchange.com/questions/4746412/definition-of-convolutionI am currently studying calculus, but I am stuck with the definition of convolution in terms of constructing the mean of a function. Suppose we have two functions, $f ...Mon, 06 Apr 2026 17:30:00 GMThttps://math.stackexchange.com/questions/4561334/what-is-convolution-how-does-it-relate-to-inner-productMy final question is: what is the intuition behind convolution? what is its relation with the inner product? I would appreciate it if you include the examples I gave above and correct me if I am wrong.Thu, 09 Apr 2026 18:59:00 GMThttps://math.stackexchange.com/questions/1015498/what-is-the-convolution-of-a-function-f-with-a-delta-function-deltaI am merely looking for the result of the convolution of a function and a delta function. I know there is some sort of identity but I can't seem to find it. $\int_ {-\infty}^ {\infty} f (u-x)\delta...Fri, 10 Apr 2026 20:52:00 GMThttps://math.stackexchange.com/questions/1937630/convolution-and-multiplication-of-polynomials-is-the-sameThe term inside the parentheses is the discrete convolution of the coefficients. The fact that convolution shows up when doing products of polynomials is pretty closely tied to group theory and is actually very important for the theory of locally compact abelian groups.Sat, 11 Apr 2026 23:07:00 GMThttps://math.stackexchange.com/questions/5004105/why-are-different-operations-in-mathematics-referred-to-as-convolutionConvolution appears in many mathematical contexts, such as signal processing, probability, and harmonic analysis. Each context seems to involve slightly different formulas and operations: In stand...Sat, 04 Apr 2026 13:36:00 GMThttps://math.stackexchange.com/questions/4139103/understanding-youngs-convolution-inequality-and-its-relation-to-convex-bodiesOn Pg. 34 of this reference, I encountered Young's Convolution Inequality. The author states the inequality and manipulates it into various forms. I write this post to better understand the manipul...Wed, 08 Apr 2026 16:08:00 GMThttps://math.stackexchange.com/questions/2953358/what-is-the-convolution-of-2-dirac-functions4 You could do it using the Laplace transform and the convolution theorem for Laplace transforms.Sat, 04 Apr 2026 17:53:00 GMT