Does there exists a non constant analytic map $f:A\to B$ . Where $A=\{z\in \mathbb C~:~ |z|\neq 0\}$ and $B=\{z \in \mathbb C ~:~ |z|>1\}$. I am unable to construct one
Asked
Active
Viewed 54 times
0
-
@G.Sassatelli sorry i forgot to add non constant map – NewB Jun 24 '16 at 06:19
-
I thought so.${}{}{}{}{}{}{}{}$ – Jun 24 '16 at 06:24