Zero localization and asymptotic behavior of orthogonal polynomials of Jacobi-Sobolev

Héctor Pijeira; Yamilet Quintana; Wilfredo Urbina

Publicado

2001-07-01

Zero localization and asymptotic behavior of orthogonal polynomials of Jacobi-Sobolev

Palabras clave:

Sobolev inner product, orthogonal polynomials, asymptotic behavior, distribution of zeros (es)

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Autores/as

Héctor Pijeira Universidad de Matanzas
Yamilet Quintana Universidad Central de Venezuela
Wilfredo Urbina Universidad Central de Venezuela

Resumen
Estadísticas

Resumen (es)

In this article we consider the Sobolev orthogonal polynomials associated to the Jacobi's measure on [-1, 1]. It is proven that for the class of monic Jacobi-Sobolev orthogonal polynomials, the smallest closed interval that contains its real zeros is [-√(1+2C, √ 1+2C] with C a constant explicitly determined. The asymptotic distribution of those zeros is studied and also we analyze the asymptotic comparative behavior between the sequence of monic Jacobi-Sobolev orthogonal polynomials and the sequence of monic Jacobi ortogonal polynomials under certain restrictions.