Direccion General de Investigacion [MTM2014-54053-P]

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Direccion General de Investigacion [MTM2014-54053-P]

Authors

Publications

Modified Stieltjes polynomials and Gauss-Kronrod quadrature rules

de la Calle Ysern, B.; Spalević, Miodrag

(Springer Heidelberg, Heidelberg, 2018) 

TY  - JOUR
AU  - de la Calle Ysern, B.
AU  - Spalević, Miodrag
PY  - 2018
UR  - https://machinery.mas.bg.ac.rs/handle/123456789/2944
AB  - Modified Stieltjes polynomials are defined and used to construct suboptimal extensions of Gaussian rules with one or two degrees less of polynomial exactness than the corresponding Kronrod extension. We prove that, for wide classes of weight functions and a sufficiently large number of nodes, the extended quadratures have positive weights and simple nodes on the interval . The classes of weight functions considered complement those for which the Gauss-Kronrod rule is known to exist. Also, strong asymptotic representations on the whole interval are given for the modified Stieltjes polynomials, which prove that they behave asymptotically as orthogonal polynomials. Finally, we provide some numerical examples.
PB  - Springer Heidelberg, Heidelberg
T2  - Numerische Mathematik
T1  - Modified Stieltjes polynomials and Gauss-Kronrod quadrature rules
EP  - 35
IS  - 1
SP  - 1
VL  - 138
DO  - 10.1007/s00211-017-0901-y
ER  - 
@article{
author = "de la Calle Ysern, B. and Spalević, Miodrag",
year = "2018",
abstract = "Modified Stieltjes polynomials are defined and used to construct suboptimal extensions of Gaussian rules with one or two degrees less of polynomial exactness than the corresponding Kronrod extension. We prove that, for wide classes of weight functions and a sufficiently large number of nodes, the extended quadratures have positive weights and simple nodes on the interval . The classes of weight functions considered complement those for which the Gauss-Kronrod rule is known to exist. Also, strong asymptotic representations on the whole interval are given for the modified Stieltjes polynomials, which prove that they behave asymptotically as orthogonal polynomials. Finally, we provide some numerical examples.",
publisher = "Springer Heidelberg, Heidelberg",
journal = "Numerische Mathematik",
title = "Modified Stieltjes polynomials and Gauss-Kronrod quadrature rules",
pages = "35-1",
number = "1",
volume = "138",
doi = "10.1007/s00211-017-0901-y"
}
de la Calle Ysern, B.,& Spalević, M.. (2018). Modified Stieltjes polynomials and Gauss-Kronrod quadrature rules. in Numerische Mathematik
Springer Heidelberg, Heidelberg., 138(1), 1-35.
https://doi.org/10.1007/s00211-017-0901-y
de la Calle Ysern B, Spalević M. Modified Stieltjes polynomials and Gauss-Kronrod quadrature rules. in Numerische Mathematik. 2018;138(1):1-35.
doi:10.1007/s00211-017-0901-y .
de la Calle Ysern, B., Spalević, Miodrag, "Modified Stieltjes polynomials and Gauss-Kronrod quadrature rules" in Numerische Mathematik, 138, no. 1 (2018):1-35,
https://doi.org/10.1007/s00211-017-0901-y . .
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