Existence of (complex) limit z->0 (z^a)

Knissp · Sep 22, 2009

Homework Statement

Justify for which complex values of a does the principal value of [tex]z^a[/tex] have a limit as z tends to 0?

Homework Equations

[tex]z^a = e^{a log(z)} [/tex]

[tex]log(z) = log|z| + (i) (arg(z)) [/tex]

The Attempt at a Solution

[tex]Lim_{z \rightarrow 0} z^a = Lim_{z \rightarrow 0} e^{(a) (log(z))} [/tex]

[tex]=Lim_{|z| \rightarrow 0} e^{(a) (log|z|) + (i) (a) (arg(z))}[/tex]

Let [tex]a = u + i v [/tex].

[tex]=Lim_{|z| \rightarrow 0} e^{(u+iv) (log|z| + (i) (u+iv) (arg(z)))}[/tex]

[tex]=Lim_{|z| \rightarrow 0} e^{(u) (log|z|) + (i) (v) (log|z|) + (i) (u) (arg(z)) - (v) (arg(z))}[/tex]

[tex]=Lim_{|z| \rightarrow 0} e^{(u) (log|z|)} e^{(i) (v) (log|z|)} e^{(i) (u) (arg(z))} e^{-v (arg(z))}[/tex]

[tex]=Lim_{|z| \rightarrow 0} |z|^u e^{(i) (v) (log|z|)} e^{((i) (u) - (v)) (arg(z))}[/tex]

I just noticed a big mistake here, so I'm erasing this part. Any ideas?

tiny-tim · Sep 22, 2009

Hi Knissp!

Isn't it easier just to go polar, and put z = re^iθ ?

Existence of (complex) limit z->0 (z^a)

Homework Statement

Homework Equations

The Attempt at a Solution

1. What is the definition of the complex limit z->0 (z^a)?

2. How is the complex limit z->0 (z^a) different from a real limit?

3. Can the complex limit z->0 (z^a) exist if a is a complex number?

4. How can I determine the existence of the complex limit z->0 (z^a)?

5. What are some applications of the complex limit z->0 (z^a)?

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