New approach on interpolating sequences for the Bloch space

When we deal with $H^{\infty}$, it is known that $c_0-$interpolating sequences are interpolating and it is sufficient to interpolate idempotents of $\ell_\infty$ in order to interpolate the whole $\ell_\infty$. We will extend these results to the frame of interpolating sequences in the classical Bloch space $\mathcal{B}$ and we will provide new characterizations of interpolating sequences for $\mathcal{B}$. For that, bearing in mind that $\mathcal{B}$ is isomorphic but not isometric to the bidual of the little Bloch space $\mathcal{B}_0$, we will prove that given an interpolating sequence $(z_n)$ for $\mathcal{B}$, the second adjoint of the interpolating operator which maps $f \in \mathcal{B}_0$ to the sequence $(f'(z_n))(1-|z_n|^2))$ can be perfectly identified with the corresponding interpolating operator from $\mathcal{B}$ onto $\ell_\infty$. Furthermore, we will prove that interpolating sequences for $H^{\infty}$ are also interpolating for $\mathcal{B}$. This yields us to provide examples of interpolating sequences which are $\varepsilon-$separated for the pseudohyperbolic distance for $\varepsilon >0$ as small as we want such that $\varepsilon$ cannot be increased.