Add to ORKGThis paper describes a new computational approach to multivariate scattered data interpolation. It is assumed that the data is generated by a Lipschitz continuous function f. The proposed approach uses the central interpolation scheme, which produces an optimal interpolant in the worst case scenario. It provides best uniform error bounds on f, and thus translates into reliable learning of f. This paper develops a computationally efficient algorithm for evaluating the interpolant in the multivariate case. We compare the proposed method with the radial basis functions and natural neighbor interpolation, provide the details of the algorithm and illustrate it on numerical experiments. The efficiency of this method surpasses alternative interpol...
Introducing a suitable variational formulation for the local error of scattered data interpolation b...
Interpolation or approximation of scattered data is very often task in engineering problems. The Rad...
This thesis deals with generalized inverses, multivariate polynomial interpolation and approximation...
This paper describes a new computational approach to multivariate scattered data interpolation. It i...
AbstractThis paper describes a new computational approach to multivariate scattered data interpolati...
This paper describes a new method of monotone interpolation and smoothing of multivariate scattered ...
AbstractAn efficient method for the multivariate interpolation of very large scattered data sets is ...
This paper describes a new approach to multivariate scattered data smoothing. It is assumed that the...
. We study the computational complexity, the error behavior, and the numerical stability of interpol...
Radial Basis Functions (RBF) interpolation theory is briefly introduced at the “application level” i...
Multivariate interpolation of smooth data using smooth radial basis functions is considered. The beh...
AbstractMultivariate interpolation of smooth data using smooth radial basis functions is considered....
AbstractGiven a function f in scattered data points x1,…,xn ∈ RS we solve the least squares problem ...
AbstractA multivariate interpolation operator on scattered data, expressed as a convex combination o...
Scattered data interpolation problems arise in many applications. Shepard’s method for construct-ing...
Introducing a suitable variational formulation for the local error of scattered data interpolation b...
Interpolation or approximation of scattered data is very often task in engineering problems. The Rad...
This thesis deals with generalized inverses, multivariate polynomial interpolation and approximation...
This paper describes a new computational approach to multivariate scattered data interpolation. It i...
AbstractThis paper describes a new computational approach to multivariate scattered data interpolati...
This paper describes a new method of monotone interpolation and smoothing of multivariate scattered ...
AbstractAn efficient method for the multivariate interpolation of very large scattered data sets is ...
This paper describes a new approach to multivariate scattered data smoothing. It is assumed that the...
. We study the computational complexity, the error behavior, and the numerical stability of interpol...
Radial Basis Functions (RBF) interpolation theory is briefly introduced at the “application level” i...
Multivariate interpolation of smooth data using smooth radial basis functions is considered. The beh...
AbstractMultivariate interpolation of smooth data using smooth radial basis functions is considered....
AbstractGiven a function f in scattered data points x1,…,xn ∈ RS we solve the least squares problem ...
AbstractA multivariate interpolation operator on scattered data, expressed as a convex combination o...
Scattered data interpolation problems arise in many applications. Shepard’s method for construct-ing...
Introducing a suitable variational formulation for the local error of scattered data interpolation b...
Interpolation or approximation of scattered data is very often task in engineering problems. The Rad...
This thesis deals with generalized inverses, multivariate polynomial interpolation and approximation...