Nikishin systems on the unit circle
We introduce Nikishin system of $r$ probability measures on the unit circle. We show that such systems satisfy the AT property and therefore normality, introduced in~\cite{KVMLOPUC}, for any multi-index $(n_1,\ldots,n_r)\in\mathbb{N}^r$ with same-parity components satisfying $n_1 \ge n_2 \ge\ldots\g...
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Zusammenfassung: | We introduce Nikishin system of $r$ probability measures on the unit circle.
We show that such systems satisfy the AT property and therefore normality,
introduced in~\cite{KVMLOPUC}, for any multi-index
$(n_1,\ldots,n_r)\in\mathbb{N}^r$ with same-parity components satisfying $n_1
\ge n_2 \ge\ldots\ge n_r$. In the case of $r=2$, we demonstrate that the same
property holds without requiring $n_1 \ge n_2 \ge\ldots\ge n_r$.
The analogous simple proof works for Nikishin systems on the real line for
indices satisfying $n_j\ge \max\{n_{j+1},\ldots,n_r\}-1$, $j=1,\ldots,r-1$.
This is related to the proof by Cousseement and Van Assche for $r=2$. |
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DOI: | 10.48550/arxiv.2410.20813 |