D. P. L. Castrigiano, W. Klopfer
Published 2000-11-28Version 1
Let a sequence $(P_n)$ of polynomials in one complex variable satisfy a recurre ce relation with length growing slowlier than linearly. It is shown that $(P_n) $ is an orthonormal basis in $L^2_{\mu}$ for some measure $\mu$ on $\C$, if and o ly if the recurrence is a $3-$term relation with special coefficients. The supp rt of $\mu$ lies on a straight line. This result is achieved by the analysis of a formally normal irreducible Hessenberg operator with only finitely many nonzero entries in every row. It generalizes the classical Favard's Theorem and the Representation Theorem.
Every frame is a sum of three (but nottwo) orthonormal bases, and other frame representations
A remark on approximation with polynomials and greedy bases
Constrained $L^2$-approximation by polynomials on subsets of the circle
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