Put another way, assuming it is somewhat fair to say that we have a qualitatively better handle on manifolds up to and including dimension 4 than we do for the case of 5+ dimensions, is it just a coincidence (i.e., 'non-mathematical' factors) that it seems 'natural' for us to think of space-time ...
Specifically, I would like to know whether:
$$z^a z^b = z^{a+b}$$
$$(zw)^a = z^a w^a$$
$$(z^a)^b = z^{ab}$$
hold true for any and all $z,w \in \Bbb{C}$ and $a,b \in \Bbb{R}$?
Also, I'd be interested to see any others that hold.