network profile
| bio | website | ma.utexas.edu/users/… |
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| location | ||
| age | ||
| visits | member for | 8 months |
| seen | May 10 at 18:15 | |
| stats | profile views | 4 |
I am a postdoc in Mech. Eng. at ETH Zurich
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Aug 29 |
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Fourier transform of heat equation c.f. en.wikipedia.org/wiki/Convolution_theorem |
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Aug 29 |
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Reference for a derivative formula for matrices Thank you very much! I tried using the chain rule (applied to $D_x (det(x)) = det(x) x^{-T}$ and index notation, but was left with headache. |
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Aug 29 |
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Reference for a derivative formula for matrices @Godot. This is my first post here, and I've used MathOverflow and StackExchange several times and have never received a rude remark as yours...the above identity is hardly the the same as $x' = 1$. |
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Aug 29 |
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Reference for a derivative formula for matrices True, but I'd prefer to have a more standard reference that has been through a review process, one that may even include a derivation. |
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Aug 29 |
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Reference for a derivative formula for matrices Thanks, I was looking for a textbook or paper so I can cite it, but I E-mailed Mike Brooks -- the author of the page you recommended -- for a (citable) reference |
