B-spline quasi-interpolant representations and sampling recovery of functions with mixed smoothness
Let be a set of n sample points in the d-cube Id≔[0,1]d, and a family of n functions on Id. We define the linear sampling algorithm Ln(Φ,ξ,⋅) for an approximate recovery of a continuous function f on Id from the sampled values f(x1),…,f(xn), by For the Besov class of mixed smoothness α,...
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Journal of Complexity
2016
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oai:112.137.131.14:VNU_123-109782018-12-19T09:25:10Z B-spline quasi-interpolant representations and sampling recovery of functions with mixed smoothness Dinh Dũng Quasi-interplant Quasi-interpolant representation Mixed B-spline Besov space of mixed smoothness Let be a set of n sample points in the d-cube Id≔[0,1]d, and a family of n functions on Id. We define the linear sampling algorithm Ln(Φ,ξ,⋅) for an approximate recovery of a continuous function f on Id from the sampled values f(x1),…,f(xn), by For the Besov class of mixed smoothness α, to study optimality of Ln(Φ,ξ,⋅) inLq(Id) we use the quantity where the infimum is taken over all sets of n sample points and all families in Lq(Id). We explicitly constructed linear sampling algorithms Ln(Φ,ξ,⋅)on the set of sample points ξ=Gd(m)≔{(2−k1s1,…,2−kdsd)∈Id:k1+⋯+kd≤m}, with Φ a family of linear combinations of mixed B-splines which are mixed tensor products of either integer or half integer translated dilations of the centered B-spline of order r. For various 0<p,q,θ≤∞ and 1/p<α<r, we proved upper bounds for the worst case error which coincide with the asymptotic order of in some cases. A key role in constructing these linear sampling algorithms, plays a quasi-interpolant representation of functions by mixed B-spline series with the coefficient functionals which are explicitly constructed as linear combinations of an absolute constant number of values of functions. Moreover, we proved that the quasi-norm of the Besov space is equivalent to a discrete quasi-norm in terms of the coefficient functionals. 2016-05-26T17:32:48Z 2016-05-26T17:32:48Z 2011 Book Article Dataset Dinh, D. (2011). B-spline quasi-interpolant representations and sampling recovery of functions with. Journal of Complexity. Journal of Complexity. 27, 541 – 467pp http://repository.vnu.edu.vn/handle/VNU_123/10978 vi Journal of Complexity application/pdf Journal of Complexity |
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Quasi-interplant Quasi-interpolant representation Mixed B-spline Besov space of mixed smoothness |
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Quasi-interplant Quasi-interpolant representation Mixed B-spline Besov space of mixed smoothness Dinh Dũng B-spline quasi-interpolant representations and sampling recovery of functions with mixed smoothness |
| description |
Let be a set of n sample points in the d-cube Id≔[0,1]d, and a family of n functions on Id. We define the linear sampling algorithm Ln(Φ,ξ,⋅) for an approximate recovery of a continuous function f on Id from the sampled values f(x1),…,f(xn), by
For the Besov class of mixed smoothness α, to study optimality of Ln(Φ,ξ,⋅) inLq(Id) we use the quantity
where the infimum is taken over all sets of n sample points and all families in Lq(Id). We explicitly constructed linear sampling algorithms Ln(Φ,ξ,⋅)on the set of sample points ξ=Gd(m)≔{(2−k1s1,…,2−kdsd)∈Id:k1+⋯+kd≤m}, with Φ a family of linear combinations of mixed B-splines which are mixed tensor products of either integer or half integer translated dilations of the centered B-spline of order r. For various 0<p,q,θ≤∞ and 1/p<α<r, we proved upper bounds for the worst case error which coincide with the asymptotic order of in some cases. A key role in constructing these linear sampling algorithms, plays a quasi-interpolant representation of functions by mixed B-spline series with the coefficient functionals which are explicitly constructed as linear combinations of an absolute constant number of values of functions. Moreover, we proved that the quasi-norm of the Besov space is equivalent to a discrete quasi-norm in terms of the coefficient functionals. |
| format |
Book Article Dataset |
| author |
Dinh Dũng |
| author_facet |
Dinh Dũng |
| author_sort |
Dinh Dũng |
| title |
B-spline quasi-interpolant representations and sampling recovery of functions with mixed smoothness |
| title_short |
B-spline quasi-interpolant representations and sampling recovery of functions with mixed smoothness |
| title_full |
B-spline quasi-interpolant representations and sampling recovery of functions with mixed smoothness |
| title_fullStr |
B-spline quasi-interpolant representations and sampling recovery of functions with mixed smoothness |
| title_full_unstemmed |
B-spline quasi-interpolant representations and sampling recovery of functions with mixed smoothness |
| title_sort |
b-spline quasi-interpolant representations and sampling recovery of functions with mixed smoothness |
| publisher |
Journal of Complexity |
| publishDate |
2016 |
| url |
http://repository.vnu.edu.vn/handle/VNU_123/10978 |
| _version_ |
1680967926845276160 |