Quasi-interpolation based on the ZP-element for the numerical solution of integral equations on surfaces in 
                $$\mathbb {R}^3$$
                
                    
                                    
                        
                            
                                R
                            
                            3

Dagnino, Catterina; Remogna, Sara

doi:10.1007/s10543-016-0633-x

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2024

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Cited by 7 publications

References 20 publications

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Numerical Solution of Fredholm Integral Equations by Spline Quasi-Interpolating Projectors

Aimi,

Leoni,

Remogna

2024

SEMA SIMAI Springer Series

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Numerical Solution of Fredholm Integral Equations by Spline Quasi-Interpolating Projectors

Aimi,

Leoni,

Remogna

2024

SEMA SIMAI Springer Series

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Trivariate near-best blending spline quasi-interpolation operators

et al. 2017

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A method to define trivariate spline quasi-interpolation operators (QIO) is developed by blending univariate and bivariate operators whose linear functionals allow oversampling. In this paper, we construct new operators based on univariate B-splines and bivariate box splines, exact on appropriate spaces of polynomials and having small infinity norms. An upper bound of the infinity norm for a general blending trivariate spline QIO is derived from the Bernstein-Bézier coefficients of the fundamental functions associated with the operators involved in the construction. The minimization of the resulting upper bound is then proposed and the existence of a solution is proved. The quadratic and quartic cases are completely worked out and their exact solutions are explicitly calculated.

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On spline quasi-interpolation through dimensions

Dagnino¹,

Lamberti²,

Remogna³

2022

Ann Univ Ferrara

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The approximation of functions and data in one and high dimensions is an important problem in many mathematical and scientific applications. Quasi-interpolation is a general and powerful approximation approach having many advantages. This paper deals with spline quasi-interpolants and its aim is to collect the main results obtained by the authors, also in collaboration with other researchers, in such a topic through spline dimension, i.e. in the 1D, 2D and 3D setting, highlighting the approximation properties and the reconstruction of functions and data, the applications in numerical integration and differentiation and the numerical solution of integral and differential problems.

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Quasi-interpolation based on the ZP-element for the numerical solution of integral equations on surfaces in $$\mathbb {R}^3$$ R 3

Cited by 7 publications

References 20 publications

Numerical Solution of Fredholm Integral Equations by Spline Quasi-Interpolating Projectors

Numerical Solution of Fredholm Integral Equations by Spline Quasi-Interpolating Projectors

Trivariate near-best blending spline quasi-interpolation operators

On spline quasi-interpolation through dimensions

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