How to prove this density result?

how to prove this density result?

Assume that $b\in \mathbb{C}$ such that $0<\vert b \vert <1$. We consider the familly $f_{p}=\{1,b^{p},b^{2p},b^{3p},b^{4p},...,b^{np},...)$. How can one prove that $\operatorname{Span}(f_{p}, \ p\in \mathbb{N}^{*})$ is dense in $l^{2}(\mathbb{C})$? Thanks.
Answer:

Assume that $x$ is orthogonal to each $f_p$. The function $$h(z):=\sum_{k=0}^\infty x_kz^k$$ is holomorphic on the unit disk and vanishes on the non-discrete set $\{b^p,p\geqslant 1\}$. We conclude that $h$ vanishes identically hence $x=0$.

jeffrey-c at Mathematics Visit the source

Was this solution helpful to you?

Related Q & A:

How To Find Epsnepal Klt Result?Best solution by Yahoo! Answers
How To Check Spm Trial Result?Best solution by Yahoo! Answers
How To Check Trial Spm Result?Best solution by myschoolchildren.com
How to prove that this function is primitive recursive?Best solution by Mathematics
How to prove someone hit you car?Best solution by Yahoo! Answers

Just Added Q & A:

How many active mobile subscribers are there in China?Best solution by Quora
How to find the right vacation?Best solution by bookit.com
How To Make Your Own Primer?Best solution by thekrazycouponlady.com
How do you get the domain & range?Best solution by ChaCha
How do you open pop up blockers?Best solution by Yahoo! Answers

For every problem there is a solution! Proved by Solucija.

Got an issue and looking for advice?
Ask Solucija to search every corner of the Web for help.
Get workable solutions and helpful tips in a moment.

Just ask Solucija about an issue you face and immediately get a list of ready solutions, answers and tips from other Internet users. We always provide the most suitable and complete answer to your question at the top, along with a few good alternatives below.