AbstractIn the Sparse Point Representation (SPR) method the principle is to retain the function data indicated by significant interpolatory wavelet coefficients, which are defined as interpolation errors by means of an interpolating subdivision scheme. Typically, a SPR grid is coarse in smooth regions, and refined close to irregularities. Furthermore, the computation of partial derivatives of a function from the information of its SPR content is performed in two steps. The first one is a refinement procedure to extend the SPR by the inclusion of new interpolated point values in a security zone. Then, for points in the refined grid, such derivatives are approximated by uniform finite differences, using a step size proportional to each point ...
A modified Sparse Point Representation (SPR) method is proposed to enhance the computational efficie...
In scientific computing, it is very common to visualize the approximate solution obtained by a numer...
In the recent decade, there has been growing interest in the numerical treatment of high-dimensional...
Conselho Nacional de Desenvolvimento Científico e Tecnológico (CNPq)Fundação de Amparo à Pesquisa do...
AbstractIn the Sparse Point Representation (SPR) method the principle is to retain the function data...
In this paper, we discuss the use of the sparse point representation (SPR) methodology for adaptive ...
Summary. In this paper we present a locally and dimension-adaptive sparse grid method for interpolat...
For the approximation of multidimensional functions, using classical numerical discretization scheme...
The technique of sparse grids allows to overcome the curse of dimensionality, which prevents the use...
Detailed error analyses are given for sparse-grid function representations through the combination t...
This thesis investigates a new approach to the optimization of functions using only data defined on ...
textabstractIn this paper we describe methods to approximate functions and differential operators on...
In this note, we consider the problem of interpolating a sparse function from the values of its mult...
This paper addresses the interpolation of sparse irregular data when these sparse data belong to di...
AbstractIn a previous work (Samavati and Bartels, Comput. Graphics Forum 18 (1998) 97–119) we invest...
A modified Sparse Point Representation (SPR) method is proposed to enhance the computational efficie...
In scientific computing, it is very common to visualize the approximate solution obtained by a numer...
In the recent decade, there has been growing interest in the numerical treatment of high-dimensional...
Conselho Nacional de Desenvolvimento Científico e Tecnológico (CNPq)Fundação de Amparo à Pesquisa do...
AbstractIn the Sparse Point Representation (SPR) method the principle is to retain the function data...
In this paper, we discuss the use of the sparse point representation (SPR) methodology for adaptive ...
Summary. In this paper we present a locally and dimension-adaptive sparse grid method for interpolat...
For the approximation of multidimensional functions, using classical numerical discretization scheme...
The technique of sparse grids allows to overcome the curse of dimensionality, which prevents the use...
Detailed error analyses are given for sparse-grid function representations through the combination t...
This thesis investigates a new approach to the optimization of functions using only data defined on ...
textabstractIn this paper we describe methods to approximate functions and differential operators on...
In this note, we consider the problem of interpolating a sparse function from the values of its mult...
This paper addresses the interpolation of sparse irregular data when these sparse data belong to di...
AbstractIn a previous work (Samavati and Bartels, Comput. Graphics Forum 18 (1998) 97–119) we invest...
A modified Sparse Point Representation (SPR) method is proposed to enhance the computational efficie...
In scientific computing, it is very common to visualize the approximate solution obtained by a numer...
In the recent decade, there has been growing interest in the numerical treatment of high-dimensional...