Is there any good everyday application of a convolution of 3 one-dimensional functions? How does that work? Trying to get some intuition around it. Something that maybe looks like: F ⚬ G ⚬ H= ∫ ∫ ∫f ⚬ g ⚬ h (I imagine there’d be 3 params for the pairs fg, gh, fh...?)
Ah perfect. That’s kinda analogous to the thing I’m metaphorically applying the 3-way convolution to. Thanks!
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BTW, everything is more fun in the frequency domain -- as the author of Tempo should no doubt know
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Good. And by "prove" I meant --probe--
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