How do you prove "topological continuity" (i.e. U open => f^{-1}(U) open) for f:C* -> R+, f(z)=|z|?
Both C* and R+ with the subspace topology of the euclidean topology.
I thought about rewriting z=x+iy and then looking at the pre-images in RxR
Both C* and R+ with the subspace topology of the euclidean topology.
I thought about rewriting z=x+iy and then looking at the pre-images in RxR
