Can you construct arbitrary vector spaces (e.g., the quadratics) or are the complex numbers a special case?
I personally believe that this is slightly nonsense, since vector spaces are "simply" vector spaces, while the complex numbers can be described in a variety of different algebraic structures: they're a field, a two dimensional real algebra, a one dimensional complex algebra, etc. Now, I'm sure that binary field operations will be supported for complex numbers: thus whether arbitrary vector spaces will be supported or not, it won't be a matter of "special case."
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