Rational spectral transformations and orthogonal polynomials
Journal of Computational and Applied Mathematics
Spectral transformations for Hermitian Toeplitz matrices
Journal of Computational and Applied Mathematics
Orthogonal polynomials and measures on the unit circle. The Geronimus transformations
Journal of Computational and Applied Mathematics
Szegö polynomials and Szegö quadrature for the Fejér kernel
Journal of Computational and Applied Mathematics - Special issue: Proceedings of the conference on orthogonal functions and related topics held in honor of Olav Njåstad
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In this contribution, we analyze the regularity conditions of a perturbation on a quasi-definite linear functional by the addition of Dirac delta functionals supported on N points of the unit circle or on its complement. We also deal with a new example of linear spectral transformation. We introduce a perturbation of a quasi-definite linear functional by the addition of the first derivative of the Dirac linear functional when its support is a point on the unit circle or two points symmetric with respect to the unit circle. Necessary and sufficient conditions for the quasi-definiteness of the new linear functional are obtained. Outer relative asymptotics for the new sequence of monic orthogonal polynomials in terms of the original ones are obtained. Finally, we prove that this linear spectral transform can be decomposed as an iteration of Christoffel and Geronimus linear transformations.