Add to ORKGIn the first part of this paper we apply a saddle point theorem from convex analysis to show that various constrained minimization problems are equivalent to the problem of smoothing by spline functions. In particular, we show that near-interpolants are smoothing splines with weights that arise as Lagrange multipliers corresponding to the constraints in the problem of near-interpolation. In the second part of this paper we apply certain fixed point iterations to compute these weights. A similar iteration is applied to the computation of the smoothing parameter in the problem of smoothing
AbstractWe study the reconstruction of a function defined on the real line from given, possibly nois...
In many approximation problems it is important that solutions preserve some shape properties such as...
summary:There are two grounds the spline theory stems from - the algebraic one (where splines are un...
In the first part of this paper we apply a saddle point theorem from convex analysis to show that va...
This paper is concerned with the computation of solutions to the problem of best near-interpolation ...
A parametric curve fL2 (m) ([a,b]ℝ d ) is a ``near-interpolant\u27\u27 to prescribed data z ij ℝ d a...
In recent years there has been an increasing interest in the study of interpolation procedures prese...
In their monograph, Bezhaev and Vasilenko have characterized the “mixed interpolating–smoothing spli...
In their monograph, Bezhaev and Vasilenko have characterized the “mixed interpolating–smoothing spli...
The talk deals with the conditional minimization problem, which generalizes several approximation pr...
AbstractIn their monograph, Bezhaev and Vasilenko have characterized the “mixed interpolating–smooth...
In this paper we describe methods for computing smoothing and near-interpolatory (variational) subdi...
Abstract. In [BV93], Bezhaev and Vasilenko characterize the \mixed interpolating-smoothing spline &q...
Works deals with generalized smoothing problem, which involves particular cases as an interpolating ...
summary:In the paper, we are concerned with some computational aspects of smooth approximation of da...
AbstractWe study the reconstruction of a function defined on the real line from given, possibly nois...
In many approximation problems it is important that solutions preserve some shape properties such as...
summary:There are two grounds the spline theory stems from - the algebraic one (where splines are un...
In the first part of this paper we apply a saddle point theorem from convex analysis to show that va...
This paper is concerned with the computation of solutions to the problem of best near-interpolation ...
A parametric curve fL2 (m) ([a,b]ℝ d ) is a ``near-interpolant\u27\u27 to prescribed data z ij ℝ d a...
In recent years there has been an increasing interest in the study of interpolation procedures prese...
In their monograph, Bezhaev and Vasilenko have characterized the “mixed interpolating–smoothing spli...
In their monograph, Bezhaev and Vasilenko have characterized the “mixed interpolating–smoothing spli...
The talk deals with the conditional minimization problem, which generalizes several approximation pr...
AbstractIn their monograph, Bezhaev and Vasilenko have characterized the “mixed interpolating–smooth...
In this paper we describe methods for computing smoothing and near-interpolatory (variational) subdi...
Abstract. In [BV93], Bezhaev and Vasilenko characterize the \mixed interpolating-smoothing spline &q...
Works deals with generalized smoothing problem, which involves particular cases as an interpolating ...
summary:In the paper, we are concerned with some computational aspects of smooth approximation of da...
AbstractWe study the reconstruction of a function defined on the real line from given, possibly nois...
In many approximation problems it is important that solutions preserve some shape properties such as...
summary:There are two grounds the spline theory stems from - the algebraic one (where splines are un...