The integral of the convolution between functions f

muzialis

Hello there,

I am really struggling to prove that
"The integral of the convolution between functions f and gequals the product of their integrals", http://en.wikipedia.org/wiki/Convolution#Integration
Can anybody give me a hint?

Many thanks

micromass

What did you try?? Where are you stuck?

mathman

∫{∫f(y)g(x-y)dy}dx = ∫f(y){∫g(y-x)dx}dy (Fubini)
= ∫f(y){∫g(u)du)}dy = ∫f(y)dy∫g(u)du

muzialis

Thanks very muhc for your help.
I was following the line given by Mathman, but did not realize that the variable translation would not affcet the value of the integral as the integration domain is the whole real line, many thanks

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muzialis	The integral of the convolution between functions f Hello there, I am really struggling to prove that "The integral of the convolution between functions f and gequals the product of their integrals", http://en.wikipedia.org/wiki/Convolution#Integration Can anybody give me a hint? Many thanks

micromass Mentor Blog Entries: 8	What did you try?? Where are you stuck?

mathman Recognitions: Science Advisor	∫{∫f(y)g(x-y)dy}dx = ∫f(y){∫g(y-x)dx}dy (Fubini) = ∫f(y){∫g(u)du)}dy = ∫f(y)dy∫g(u)du