Convergence of linear combinations of iterates of an inner function
Abstract: Let $f$ be an inner function with $f(0)=0$ which is not a rotation and let $f{n}$ be its $n$-th iterate. Let ${a_{n}}$ be a sequence of complex numbers. We prove that the series $\sum a_{n}f{n}(\xi)$ converges at almost every point $\xi$ of the unit circle if and only if $\sum |a_n|2 < \infty$. The main step in the proof is to show that under this assumption, the function $F= \sum a_n fn$ has bounded mean oscillation. We also prove that $F$ is bounded on the unit disc if and only if $\sum |a_n| < \infty$. Finally we describe the sequences of coefficients ${a_n }$ such that $F$ belongs to other classical function spaces, as the disc algebra and the Dirichlet class.
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