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by ogogmad
1430 days ago
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A holomorphic function over the split-complex numbers is the direct sum of two holomorphic functions over R. In that sense, it's trivial. You will be very disappointed once you see the split-complex Mandelbrot set. It will be an instructive exercise for you to see why it looks the way it does. My point about complex conjugation is illustrated in [1]. Linear algebra over the complex numbers does not limit itself to the four arithmetic operations {+,-,*,/}, but uses complex conjugation as the 5th and final operation. Look at the definition of a unitary matrix, or a self-adjoint matrix, or a normal matrix. Also, look at the definitions of the QR decomposition and SVD. Complex conjugation is everywhere in linear algebra. Consequently, matrix theory over the split-complex numbers is actually somewhat interesting. [1] - https://en.wikipedia.org/wiki/Matrix_decomposition To some extent, this seems like a weird discussion about mathematical aesthetics. |
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Linear algebra does a lot of things, ie. transpose, that aren't algebraic. I think it's important we understand what is computational versus algebraic. In that vain, linear algebra proves to be immensely useful, but we will trip ourselves if we start thinking certain aspects of it are analytic.
Anyhow, point taken, that image hardly looks interesting.
I think we agree and like you said, are just talking about aesthetics. I agree that the utility of math doesn't end at algebra or analyticity.
https://en.wikipedia.org/wiki/Hermitian_adjoint