Publication: Lebesgue perturbation of a quasi-definite Hermitian functional. The positive definite case
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2003-08-01
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Elsevier
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Abstract
In this work we study the problem of orthogonality with respect to a sum of measures or functionals. First we consider the case where one of the functionals is arbitrary and quasi-definite and the other one is the Lebesgue normalized functional. Next we study the sum of two positive measures. The first one is arbitrary and the second one is the Lebesgue normalized measure and we obtain some relevant properties concerning the new measure. Finally we consider the sum of a Bernstein–Szegö measure and the Lebesgue measure. In this case we obtain more simple explicit algebraic relations as well as the relation between the corresponding Szegö’s functions.
Description
16 pages, no figures.-- MSC2000 codes: 33C47; 42C05.
MR#: MR1988489 (2004d:42042)
Zbl#: Zbl 1032.42030
MR#: MR1988489 (2004d:42042)
Zbl#: Zbl 1032.42030
Keywords
Orthogonal polynomials, Quasi-definite functionals, Lebesgue measure, Szegö condition, Bernstein–Szegö measures
Bibliographic citation
Linear Algebra and its Applications, 2003, vol. 369, p. 235-250