AbstractThe moving-least-squares approach, first presented by McLain [1], is a method for approximating multivariate functions using scattered data information. The method is using local polynomial approximations, incorporating weight functions of different types. Some weights, with certain singularities, induce C∞ interpolation approximation in ℝn. In this work we present a way of generalizing the method to enable Hermite type interpolation, namely, interpolation to derivatives' data as well. The essence of the method is the use of an appropriate metric in the construction of the local polynomial approximations
We propose a fast and accurate approximation method for large sets of multivariate data using radia...
AbstractA new estimate is derived for the error committed in approximating a continuous function by ...
This paper reformulates the moving least square interpolation scheme in a framework of the so-called...
For multivariate problems with many scattered data locations the use of radial functions has proven ...
AbstractIt is a common procedure for scattered data approximation to use local polynomial fitting in...
AbstractGiven a function f in scattered data points x1,…,xn ∈ RS we solve the least squares problem ...
AbstractMoving least-squares methods for interpolation or approximation of scattered data are well k...
The Element-free Galerkin Method has become a very popular tool for the simulation of mechanical pro...
Abstract. We propose a fast and accurate approximation method for large sets of multivariate data us...
AbstractMoving least-square (MLS) is an approximation method for data interpolation, numerical analy...
Abstract This contribution is a sequel of the report [1]. In PDE-constrained global optimization (e....
Abstract. We describe two experiments recently conducted with the approximate moving least squares (...
In this paper, we modify the robust local image estimation method of R. van den Boomgaard and J. van...
Abstract. The radial basis function interpolant is known to be the best approximation to a set of sc...
In a foregoing paper [Sonar, ESAIM: M2AN 39 (2005) 883–908] we analyzed the Interpolating Moving Lea...
We propose a fast and accurate approximation method for large sets of multivariate data using radia...
AbstractA new estimate is derived for the error committed in approximating a continuous function by ...
This paper reformulates the moving least square interpolation scheme in a framework of the so-called...
For multivariate problems with many scattered data locations the use of radial functions has proven ...
AbstractIt is a common procedure for scattered data approximation to use local polynomial fitting in...
AbstractGiven a function f in scattered data points x1,…,xn ∈ RS we solve the least squares problem ...
AbstractMoving least-squares methods for interpolation or approximation of scattered data are well k...
The Element-free Galerkin Method has become a very popular tool for the simulation of mechanical pro...
Abstract. We propose a fast and accurate approximation method for large sets of multivariate data us...
AbstractMoving least-square (MLS) is an approximation method for data interpolation, numerical analy...
Abstract This contribution is a sequel of the report [1]. In PDE-constrained global optimization (e....
Abstract. We describe two experiments recently conducted with the approximate moving least squares (...
In this paper, we modify the robust local image estimation method of R. van den Boomgaard and J. van...
Abstract. The radial basis function interpolant is known to be the best approximation to a set of sc...
In a foregoing paper [Sonar, ESAIM: M2AN 39 (2005) 883–908] we analyzed the Interpolating Moving Lea...
We propose a fast and accurate approximation method for large sets of multivariate data using radia...
AbstractA new estimate is derived for the error committed in approximating a continuous function by ...
This paper reformulates the moving least square interpolation scheme in a framework of the so-called...