I have to answer the following question:
Let $\{x_n\}_{n\ge 1}$ be a Schauder Basis. Is $\{x_{\Pi(n)}\}_{n\ge 1}$, where $\Pi(n)$ bijection of $\mathbb N$ onto $\mathbb N$, also a Schauder Basis?
It seems to me that it is not true, but I can't show that formally. Can you help me? I'm completely green in this topic.
A Schauder Basis $\{x_n\}_{n\ge 1}$ of the Banach space $X$ is called an unconditional basis if for each $x \in X$ the series
$x= \sum_{n}\xi_n x_n$
is unconditionally convergent. The space $C ( [ 0 , 1 ] )$ has a Schauder basis but no unconditional Schauder basis .