AbstractA construction of linear sufficient convexity conditions for polynomial tensor-product spline functions is presented. As the main new feature of this construction, the obtained conditions are asymptotically necessary: increasing the number of linear inequalities in a suitable manner adapts them to any finite set of strongly convex spline surfaces. Based on the linear constraints we formulate least-squares approximation of scattered data by spline surfaces as a quadratic programming problem
Abstract. After a short abstract discussion of convex approximation we specialize to a study of such...
AbstractA characterization of the best L1-approximation to a continuous function by classes of fixed...
In some regression settings one would like to combine the flexibility of nonparametric smoothing wit...
AbstractA construction of linear sufficient convexity conditions for polynomial tensor-product splin...
Least squares polynomial splines are an effective tool for data fitting, but they may fail to preser...
This report deals with approximation of a given scattered univariate or bivariate data set that poss...
AbstractConvexity conditions for Powell—Sabin splines are derived and an algorithm is presented for ...
AbstractThe cyclic-shift tensor-factorization interpolation method recently described by de Boor can...
This paper presents a new framework for approximating data with smooth splines. The classical spline...
AbstractAn algorithm is described for surface fitting over a circle by using tensor product splines ...
AbstractIn some applications, the mean or median response is linearly related to some variables but ...
A general method is given for constructing sets of sufficient linear conditions that ensure convexit...
This thesis is concerned with the design and implementation of a surface fitting package in an inter...
Shape preserving approximations are constructed by interpolating the data with polynomial splines of...
AbstractWe use bivariate C1 cubic splines to deal with convexity preserving scattered data interpola...
Abstract. After a short abstract discussion of convex approximation we specialize to a study of such...
AbstractA characterization of the best L1-approximation to a continuous function by classes of fixed...
In some regression settings one would like to combine the flexibility of nonparametric smoothing wit...
AbstractA construction of linear sufficient convexity conditions for polynomial tensor-product splin...
Least squares polynomial splines are an effective tool for data fitting, but they may fail to preser...
This report deals with approximation of a given scattered univariate or bivariate data set that poss...
AbstractConvexity conditions for Powell—Sabin splines are derived and an algorithm is presented for ...
AbstractThe cyclic-shift tensor-factorization interpolation method recently described by de Boor can...
This paper presents a new framework for approximating data with smooth splines. The classical spline...
AbstractAn algorithm is described for surface fitting over a circle by using tensor product splines ...
AbstractIn some applications, the mean or median response is linearly related to some variables but ...
A general method is given for constructing sets of sufficient linear conditions that ensure convexit...
This thesis is concerned with the design and implementation of a surface fitting package in an inter...
Shape preserving approximations are constructed by interpolating the data with polynomial splines of...
AbstractWe use bivariate C1 cubic splines to deal with convexity preserving scattered data interpola...
Abstract. After a short abstract discussion of convex approximation we specialize to a study of such...
AbstractA characterization of the best L1-approximation to a continuous function by classes of fixed...
In some regression settings one would like to combine the flexibility of nonparametric smoothing wit...