I'm trying to solve a problem involving a Hilbert space $H$ and corresponding Hilbert basis $\mathcal B$ where $\{x_n\} \subset H$ is a sequence satisfying $\lim_{n \to \infty} \langle x_n, b \rangle = 0$ for all $b \in \mathcal B$. But I can't think of any examples of such a space and basis and sequence except the trivial case where $x_n \to 0$. Can someone please give me a simple example? Say on $\mathbb R^d$, or on one of the other standard Hilbert space examples studied in introductory functional analysis.
Sequence in Hilbert space whose inner product with all basis vectors goes to 0
functional-analysishilbert-spacesinner-products
Best Answer
Take any Hilbert space with a countable orthonormal basis $(e_n)$ and take $x_n=e_n$ for all $n$.