The application of Powell-Sabin's or Clough-Tocher's schemes to scattered data problems, as known requires the knowledge of the partial derivatives of first order at the vertices of an underlying triangulation. We study a local method for generating partial derivatives based on the minimization of the energy functional on the star of triangles sharing a node that we called a cell. The functional is associated to some piecewise polynomial function interpolating the points. The proposed method combines the global Method II by Renka and Cline (cf. [16, pp. 230-231]) with the variational approach suggested by Alfeld (cf. [2]) with care to efficiency in the computations. The locality together with some implementation strategies produces a method...
AbstractIn this paper we first revisit a classical problem of computing variational splines. We prop...
Smooth surface reconstruction of scattered data built from Delaunay triangulation need the partial d...
summary:Let $\mathcal T_h$ be a triangulation of a bounded polygonal domain $\Omega \subset \Re ^2$,...
The application of widely known blending methods for constructing C1 bivariate functions interpolati...
The application of widely known blending methods for constructing C1 bivariate functions interpolati...
The paper is concerned with one problem of function interpolation on a triangle. We consider a large...
The paper deals with the description of a method and the accompanying software, the package LABSUP, ...
We discuss a pointwise numerical differentiation formula on multivariate scattered data, based on th...
summary:We study the problem of Lagrange interpolation of functions of two variables by quadratic po...
AbstractWe develop a local Lagrange interpolation scheme for quartic C1 splines on triangulations. G...
Local numerical methods for scattered data interpolation often require a smart subdivision of the do...
AbstractThe purpose of this paper is to describe new schemes of interpolation to the boundary values...
AbstractThe four-point interpolatory subdivision scheme of Dubuc and its generalizations to irregula...
Rational and polynomial 'smooth ' interpolation schemes are derived which interpo...
A range restricted C1 interpolation local scheme to scattered data is derived. Each macro triangle o...
AbstractIn this paper we first revisit a classical problem of computing variational splines. We prop...
Smooth surface reconstruction of scattered data built from Delaunay triangulation need the partial d...
summary:Let $\mathcal T_h$ be a triangulation of a bounded polygonal domain $\Omega \subset \Re ^2$,...
The application of widely known blending methods for constructing C1 bivariate functions interpolati...
The application of widely known blending methods for constructing C1 bivariate functions interpolati...
The paper is concerned with one problem of function interpolation on a triangle. We consider a large...
The paper deals with the description of a method and the accompanying software, the package LABSUP, ...
We discuss a pointwise numerical differentiation formula on multivariate scattered data, based on th...
summary:We study the problem of Lagrange interpolation of functions of two variables by quadratic po...
AbstractWe develop a local Lagrange interpolation scheme for quartic C1 splines on triangulations. G...
Local numerical methods for scattered data interpolation often require a smart subdivision of the do...
AbstractThe purpose of this paper is to describe new schemes of interpolation to the boundary values...
AbstractThe four-point interpolatory subdivision scheme of Dubuc and its generalizations to irregula...
Rational and polynomial 'smooth ' interpolation schemes are derived which interpo...
A range restricted C1 interpolation local scheme to scattered data is derived. Each macro triangle o...
AbstractIn this paper we first revisit a classical problem of computing variational splines. We prop...
Smooth surface reconstruction of scattered data built from Delaunay triangulation need the partial d...
summary:Let $\mathcal T_h$ be a triangulation of a bounded polygonal domain $\Omega \subset \Re ^2$,...