Characterizing the measures on the unit circle with exact quadrature formulas in the space of polynomials

Chebyshev-type quadrature for analytic weights on the circle and the interval

Kuijlaars, A.B.J.

December 1995

AbstractWe give a sharp asymptotic bound on the number of nodes needed for Chebyshev-type (= equal w...

Quadrature formulas on the unit circle based on rational functions

Bultheel, Adhemar
Hendriksen, Erik
González-Vera, Pablo
Njåstad, Olav

May 1994

AbstractQuadrature formulas on the unit circle were introduced by Jones in 1989. On the other hand, ...

Singular Measures on the Unit Circle and Their Reflection Coefficients

Golinskii, Leonid

March 2000

AbstractOrthogonal polynomials on the unit circle are determined by their reflection coefficients th...

Characterizing the measures on the unit circle with exact quadrature formulas in the space of polynomials

Berriochoa, E.
Cachafeiro, A.
García Amor, J.

October 2009

AbstractIn the present paper we characterize the measures on the unit circle for which there exists ...

A new numerical quadrature formula on the unit circle

Berriochoa, Elías
Cachafeiro, Alicia
Marcellán Español, Francisco José

April 2007

11 pages, no figures.-- MSC2000 codes: 33C47, 42C05, 65D30.MR#: MR2335810 (2008i:33038)Zbl#: Zbl 112...

New quadrature rules for Bernstein measures on the interval [-1,1]

Berriochoa, Elías
Cachafeiro, Alicia
García-Amor, José M.
Marcellán Español, Francisco José

October 2008

13 pages, no figures.-- MSC2000 codes: 33C47, 42C05.MR#: MR2480082Zbl#: Zbl pre05602092In the presen...

Nodal systems with maximal domain of exactness for Gaussian quadrature formulas

Berriochoa, E.
Cachafeiro, A.

March 2008

AbstractThe aim of this work is to study quadrature formulas for measures on the complex plane. The ...

Quadrature and orthogonal rational functions

Bultheel, A.
González-Vera, P.
Hendriksen, E.
Njåstad, Olav

January 2001

AbstractClassical interpolatory or Gaussian quadrature formulas are exact on sets of polynomials. Th...

Quadrature formulas on the unit circle with prescribed nodes and maximal domain of validity

Bultheel, Adhemar
Daruis, Leyla
González-Vera, Pablo

September 2009

AbstractIn this paper we investigate the Szegő–Radau and Szegő–Lobatto quadrature formulas on the un...

Quadrature formulas associated with rational modifications of the Chebyshev weight functions

Darius, L.
González-Vera, P.
Jiménez Paiz, M.

February 2006

AbstractMaking use of the connection between quadrature formulas on the unit circle and the interval...

Quadrature Formula and Zeros of Para-Orthogonal Polynomials on the Unit Circle

Leonid Golinskii

January 2000

Introduction Orthonormal polynomials on the unit circle T { C : are defined by n , #m ...

Chebyshev-type quadrature and zeros of Faber polynomials

Kuijlaars, A.B.J.

September 1995

AbstractWith any probability measure μ on [−1, 1] we associate a sequence of polynomials Fn(z) which...

Stieltjes-type polynomials on the unit circle

Calle Ysern, Bernardo de la
López Lagomasino, Guillermo
Reichel, Lothar

April 2009

29 pages, no figures.-- MSC2000 codes: Primary 65D32, 42A10, 42C05; Secondary 30E20.MR#: MR2476567St...

Some Characterization Theorems for Measures Associated with Orthogonal Polynomials on the Unit Circle

K. Pan
E. B. Saff

April 2015

Abstract. Let {Ij>,,} be a system of polynomials orthonormal on the unit circle,vith respect to a...

Orthogonal polynomials with respect to the sum of an arbitrary measure and a Bernstein-Szegö measure

Cachafeiro, Alicia
Marcellán Español, Francisco José
Pérez, C.

January 2007

24 pages, no figures.-- MSC2000 codes: 33C47, 42C05.-- Dedicated to Professor Dr. Mariano Gasca with...

Chebyshev-type quadrature for analytic weights on the circle and the interval

Kuijlaars, A.B.J.

December 1995

AbstractWe give a sharp asymptotic bound on the number of nodes needed for Chebyshev-type (= equal w...

Quadrature formulas on the unit circle based on rational functions

Bultheel, Adhemar
Hendriksen, Erik
González-Vera, Pablo
Njåstad, Olav

May 1994

AbstractQuadrature formulas on the unit circle were introduced by Jones in 1989. On the other hand, ...

Singular Measures on the Unit Circle and Their Reflection Coefficients

Golinskii, Leonid

March 2000

AbstractOrthogonal polynomials on the unit circle are determined by their reflection coefficients th...

Characterizing the measures on the unit circle with exact quadrature formulas in the space of polynomials

Berriochoa, E.
Cachafeiro, A.
García Amor, J.

October 2009

AbstractIn the present paper we characterize the measures on the unit circle for which there exists ...

A new numerical quadrature formula on the unit circle

Berriochoa, Elías
Cachafeiro, Alicia
Marcellán Español, Francisco José

April 2007

11 pages, no figures.-- MSC2000 codes: 33C47, 42C05, 65D30.MR#: MR2335810 (2008i:33038)Zbl#: Zbl 112...

New quadrature rules for Bernstein measures on the interval [-1,1]

Berriochoa, Elías
Cachafeiro, Alicia
García-Amor, José M.
Marcellán Español, Francisco José

October 2008

13 pages, no figures.-- MSC2000 codes: 33C47, 42C05.MR#: MR2480082Zbl#: Zbl pre05602092In the presen...

Nodal systems with maximal domain of exactness for Gaussian quadrature formulas

Berriochoa, E.
Cachafeiro, A.

March 2008

AbstractThe aim of this work is to study quadrature formulas for measures on the complex plane. The ...

Quadrature and orthogonal rational functions

Bultheel, A.
González-Vera, P.
Hendriksen, E.
Njåstad, Olav

January 2001

AbstractClassical interpolatory or Gaussian quadrature formulas are exact on sets of polynomials. Th...

Quadrature formulas on the unit circle with prescribed nodes and maximal domain of validity

Bultheel, Adhemar
Daruis, Leyla
González-Vera, Pablo

September 2009

AbstractIn this paper we investigate the Szegő–Radau and Szegő–Lobatto quadrature formulas on the un...

Quadrature formulas associated with rational modifications of the Chebyshev weight functions

Darius, L.
González-Vera, P.
Jiménez Paiz, M.

February 2006

AbstractMaking use of the connection between quadrature formulas on the unit circle and the interval...

Quadrature Formula and Zeros of Para-Orthogonal Polynomials on the Unit Circle

Leonid Golinskii

January 2000

Introduction Orthonormal polynomials on the unit circle T { C : are defined by n , #m ...

Chebyshev-type quadrature and zeros of Faber polynomials

Kuijlaars, A.B.J.

September 1995

AbstractWith any probability measure μ on [−1, 1] we associate a sequence of polynomials Fn(z) which...

Stieltjes-type polynomials on the unit circle

Calle Ysern, Bernardo de la
López Lagomasino, Guillermo
Reichel, Lothar

April 2009

29 pages, no figures.-- MSC2000 codes: Primary 65D32, 42A10, 42C05; Secondary 30E20.MR#: MR2476567St...

Some Characterization Theorems for Measures Associated with Orthogonal Polynomials on the Unit Circle

K. Pan
E. B. Saff

April 2015

Abstract. Let {Ij>,,} be a system of polynomials orthonormal on the unit circle,vith respect to a...

Orthogonal polynomials with respect to the sum of an arbitrary measure and a Bernstein-Szegö measure

Cachafeiro, Alicia
Marcellán Español, Francisco José
Pérez, C.

January 2007

24 pages, no figures.-- MSC2000 codes: 33C47, 42C05.-- Dedicated to Professor Dr. Mariano Gasca with...

Chebyshev-type quadrature for analytic weights on the circle and the interval

Kuijlaars, A.B.J.

December 1995

AbstractWe give a sharp asymptotic bound on the number of nodes needed for Chebyshev-type (= equal w...

Quadrature formulas on the unit circle based on rational functions

Bultheel, Adhemar
Hendriksen, Erik
González-Vera, Pablo
Njåstad, Olav

May 1994

AbstractQuadrature formulas on the unit circle were introduced by Jones in 1989. On the other hand, ...

Singular Measures on the Unit Circle and Their Reflection Coefficients

Golinskii, Leonid

March 2000

AbstractOrthogonal polynomials on the unit circle are determined by their reflection coefficients th...

Characterizing the measures on the unit circle with exact quadrature formulas in the space of polynomials

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Characterizing the measures on the unit circle with exact quadrature formulas in the space of polynomials

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