Author |
Topic: Blaschke product (Read 3622 times) |
|
John
Guest
|
Let {aj}[subseteq]D satisfy [sum]1-|aj|< [infty] and let B(z) be the corresponding Blaschke product. Let P [in] [partial]D. Prove that B has a continuous extension to P if and only if P is not an accumulation point of the aj's. I'll appreciate any help of this problem.
|
|
IP Logged |
|
|
|
Icarus
wu::riddles Moderator Uberpuzzler
Boldly going where even angels fear to tread.
Gender:
Posts: 4863
|
|
Re: Blaschke product
« Reply #1 on: Feb 5th, 2004, 9:26pm » |
Quote Modify
|
I'm sure you would, but since I have never heard of the "Blaschke product" before, and neither has my main reference, I have no help to give.
|
|
IP Logged |
"Pi goes on and on and on ... And e is just as cursed. I wonder: Which is larger When their digits are reversed? " - Anonymous
|
|
|
towr
wu::riddles Moderator Uberpuzzler
Some people are average, some are just mean.
Gender:
Posts: 13730
|
|
Re: Blaschke product
« Reply #2 on: Feb 6th, 2004, 1:02am » |
Quote Modify
|
on Feb 5th, 2004, 9:26pm, Icarus wrote:I'm sure you would, but since I have never heard of the "Blaschke product" before, and neither has my main reference, I have no help to give. |
| Your main reference isn't mathworld? http://mathworld.wolfram.com/BlaschkeProduct.html not that it enables me to be of any further use..
|
|
IP Logged |
Wikipedia, Google, Mathworld, Integer sequence DB
|
|
|
|