Kergin interpolation in Banach spaces

Filipsson, Lars

doi:10.1016/j.jat.2004.01.002

Cited by 9 publications

(13 citation statements)

References 12 publications

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“…In the present paper, we continue the investigations carried out in [1][2][3][4][5][6][7][8] and devoted to the construction of interpolation operator approximations in Hilbert spaces and to the examination of their accuracy. The problems of the construction of an operator polynomial of the Lagrange type on a specially selected set of nodes L(m) and of the analysis of the accuracy of interpolation of polynomial and entire operators were considered earlier in [4].…”

mentioning

confidence: 96%

On interpolation approximation of differentiable operators in a Hilbert space

Khlobystov

Popovicheva

2006

Ukr Math J

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In a Hilbert space, we construct an interpolation approximation of the Taylor polynomial for differentiable operators. By using this approximation, we obtain estimates of accuracy for analytic operators that strengthen previously known results and for operators containing finitely many Fréchet derivatives.In the present paper, we continue the investigations carried out in [1-8] and devoted to the construction of interpolation operator approximations in Hilbert spaces and to the examination of their accuracy. The problems of the construction of an operator polynomial of the Lagrange type on a specially selected set of nodes L(m) and of the analysis of the accuracy of interpolation of polynomial and entire operators were considered earlier in [4]. In the present paper, we propose an Hermite-type interpolation, which, as shown in what follows, is equivalent to the Lagrange interpolation on the set of nodes L(m) for polynomial operators and enables one, in the case of infinitely differentiable nonpolynomial operators, to strengthen the results concerning the convergence of interpolation processes (the case of Gâteaux analytic operators) and to obtain an estimate for the accuracy of approximations (the case of finitely many higher Fréchet derivatives of the operator), which is impossible within the framework of the Lagrange interpolation.Let X and Y be Hilbert spaces (X is a separable space) and let F : X → Y be a Gâteaux analytic operator in the space X.

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confidence: 96%

On interpolation approximation of differentiable operators in a Hilbert space

Khlobystov

Popovicheva

2006

Ukr Math J

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“…Petersson [12], Filipsson [6] and Simon [14] have extended Kergin interpolation and approximation to the Banach space setting. Hence, the results obtained in this paper are not entirely new.…”

Section: Introductionmentioning

confidence: 99%

Lagrange approximation in Banach spaces

Nilsson¹,

Pinasco

Zalduendo

2015

Czech Math J

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“…Some of the results achieved in [36,14,34,17,39] for polynomial interpolation in Banach spaces can be applied, since − → D n is itself a Banach space. These pioneering works were aimed at more theoretical results, whereas here we focus on the numerical analysis; in fact, error estimates are not provided in [36] or demand in [34,17,39] too much regularity. We shall point out that, although the regularity assumptions in [14] are rather weak, the conditions (i), (ii), H1 in [14] for deriving error estimates (in − → D n ) still demand research.…”

Section: Introductionmentioning

confidence: 99%

Set-valued Hermite interpolation

Baier

Perria

2011

Journal of Approximation Theory

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The problem of interpolating a set-valued function with convex images is addressed by means of directed sets. A directed set will be visualised as a usually non-convex set in R n consisting of three parts together with its normal directions: the convex, the concave and the mixed-type part. In the Banach space of the directed sets, a mapping resembling the Kergin map is established. The interpolating property and error estimates similar to the point-wise case are then shown; the representation of the interpolant through means of divided differences is given. A comparison to other set-valued approaches is presented. The method developed within the article is extended to the scope of the Hermite interpolation by using the derivative notion in the Banach space of directed sets. Finally, a numerical analysis of the explained technique corroborates the theoretical results.

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Kergin interpolation in Banach spaces

Cited by 9 publications

References 12 publications

On interpolation approximation of differentiable operators in a Hilbert space

On interpolation approximation of differentiable operators in a Hilbert space

Lagrange approximation in Banach spaces

Set-valued Hermite interpolation

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