2020
DOI: 10.1553/etna_vol53s352
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Error estimates of Gaussian-type quadrature formulae for analytic functions on ellipses-a survey of recent results

Abstract: This paper presents a survey of recent results on error estimates of Gaussian-type quadrature formulas for analytic functions on confocal ellipses.

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Cited by 6 publications
(5 citation statements)
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“…where l(Γ) denotes the length of the contour Γ (see [2]). A common choice for the contour Γ is one of the confocal ellipses with foci at the points ∓1, also known as Bernstein ellipses, and the sum of semi-axes ρ > 1,…”
Section: Etnamentioning
confidence: 99%
See 1 more Smart Citation
“…where l(Γ) denotes the length of the contour Γ (see [2]). A common choice for the contour Γ is one of the confocal ellipses with foci at the points ∓1, also known as Bernstein ellipses, and the sum of semi-axes ρ > 1,…”
Section: Etnamentioning
confidence: 99%
“…A recent survey of error bounds (2.4) as well as of related bound, when Γ = E ρ , for Gaussian type q.f. can be found in [2].…”
Section: Etnamentioning
confidence: 99%
“…Although statements of this kind are clearly false in general, in our cases they are justified by a simple result which was shown in the recent survey paper (cf. [5,Theorem 4.1]). To make the paper self-contained, the statement of this result is included.…”
Section: Appendix Computing the Kernel For The Other Modified Chebysh...mentioning
confidence: 99%
“…Indeed, the expression above for f (ρ, θ 0 ) − f (ρ, θ) = P (ρ,θ) R(ρ,θ)R(ρ,θ 0 ) shows that it suffices to prove that P (ρ, θ) is positive for all θ = θ 0 , whenever ρ is large enough. For the complete proof see [5].…”
Section: Appendix Computing the Kernel For The Other Modified Chebysh...mentioning
confidence: 99%
See 1 more Smart Citation