We solve various variational spline curve problems subject to polygonal constraints, including best near interpolation, smoothing splines with obstacles, shape preserving spines, best spline by spline approximation, and polynomial degree reduction with polygonal constraints. To solve these problems, we develop the active set method for quadratic programming. We provide necessary and sufficient conditions for global minima. We show how to efficiently implement the algorithm using rank one updates of QR factorizations, without the need for dual bases. We show that the algorithm will converge in finite steps (under certain conditions), which solves an open problem posed in the literature. We show that solutions to the problem of near interpola...
AbstractThis paper addresses new algorithms for constructing weighted cubic splines that are very ef...
In this paper, a general methodology to approximate sets of data points through Non-Uniform Rational...
The use of polynomial splines as a basis for the interpolation of discrete data can be theoretically...
We solve various variational spline curve problems subject to polygonal constraints, including best ...
We solve the problem of finding a near-interpolant curve, subject to constraints, which minimizes th...
This paper is concerned with the computation of solutions to the problem of best near-interpolation ...
This paper presents a new framework for approximating data with smooth splines. The classical spline...
AbstractKarlin has shown that there exists a perfect spline ƒ ϵ Cn − 1 of order n which interpolates...
International audienceThis article introduces a new class of constraints for spline variational mode...
International audienceIn this article, we address the problem of approximating data points by C1-smo...
In some regression settings one would like to combine the flexibility of nonparametric smoothing wit...
Let S0 and S1 be two spaces of polynomial spline curves s : [a,b] → IRd, of order k0 and k1 with k1\...
An active contour model for parametric curve and surface approximation is presented. The active curv...
This report deals with approximation of a given scattered univariate or bivariate data set that poss...
AbstractThis paper describes the use of cubic splines for interpolating monotonic data sets. Interpo...
AbstractThis paper addresses new algorithms for constructing weighted cubic splines that are very ef...
In this paper, a general methodology to approximate sets of data points through Non-Uniform Rational...
The use of polynomial splines as a basis for the interpolation of discrete data can be theoretically...
We solve various variational spline curve problems subject to polygonal constraints, including best ...
We solve the problem of finding a near-interpolant curve, subject to constraints, which minimizes th...
This paper is concerned with the computation of solutions to the problem of best near-interpolation ...
This paper presents a new framework for approximating data with smooth splines. The classical spline...
AbstractKarlin has shown that there exists a perfect spline ƒ ϵ Cn − 1 of order n which interpolates...
International audienceThis article introduces a new class of constraints for spline variational mode...
International audienceIn this article, we address the problem of approximating data points by C1-smo...
In some regression settings one would like to combine the flexibility of nonparametric smoothing wit...
Let S0 and S1 be two spaces of polynomial spline curves s : [a,b] → IRd, of order k0 and k1 with k1\...
An active contour model for parametric curve and surface approximation is presented. The active curv...
This report deals with approximation of a given scattered univariate or bivariate data set that poss...
AbstractThis paper describes the use of cubic splines for interpolating monotonic data sets. Interpo...
AbstractThis paper addresses new algorithms for constructing weighted cubic splines that are very ef...
In this paper, a general methodology to approximate sets of data points through Non-Uniform Rational...
The use of polynomial splines as a basis for the interpolation of discrete data can be theoretically...