Hello,
I am asked, whether for every analytic non-constant function f there exist z such as Re f(z) > |f(z)|².
I am pretty sure it is true because I read about Picard's theorems, but I cannot use that. I can use Liouville's Theorem and if needed Cauchy.
Thank you!
I am asked, whether for every analytic non-constant function f there exist z such as Re f(z) > |f(z)|².
I am pretty sure it is true because I read about Picard's theorems, but I cannot use that. I can use Liouville's Theorem and if needed Cauchy.
Thank you!
Last edited: