Andrei Martinez-Finkelshtein, Barry Simon
Published 2010-06-04, updated 2010-08-25Version 2
We show that for many families of OPUC, one has $||\varphi'_n||_2/n -> 1$, a condition we call normal behavior. We prove that this implies $|\alpha_n| -> 0$ and that it holds if the sequence $\alpha_n$ is in $\ell^1$. We also prove it is true for many sparse sequences. On the other hand, it is often destroyed by the insertion of a mass point.
Comments: 36 pages, no figures. Minor corrections, to appear in the Journal of Approximation Theory
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