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that if two analytic functions on the complex plane have the same
 
that if two analytic functions on the complex plane have the same
 
derivative, then they must differ by a constant.
 
derivative, then they must differ by a constant.
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Could you just substitute the f in the form they provided, into the ODE to prove that you can assume the solution is of that form? --[[User:Apdelanc|Adrian Delancy]]

Revision as of 05:38, 24 September 2009


Homework 4

HWK 4 problems

Hint for IV.6.3 --Steve Bell

We assume $ (f)''=f $ on $ \mathbb C $.

Notice that

$ (e^z f)''=e^zf +2e^zf'+e^zf''=2(e^zf + e^zf')=2(e^zf)'. $

Let $ g=e^zf. $ Then $ g'=2g $ and now you can use the theorem from class that concerns solutions of this first order complex ODE. By the way, you will also need to use the fact that if two analytic functions on the complex plane have the same derivative, then they must differ by a constant.


Could you just substitute the f in the form they provided, into the ODE to prove that you can assume the solution is of that form? --Adrian Delancy

Alumni Liaison

Ph.D. on Applied Mathematics in Aug 2007. Involved on applications of image super-resolution to electron microscopy

Francisco Blanco-Silva