AbstractWe are going to survey recent developments and achievements in shape-preserving approximation by polynomials. We wish to approximate a function f defined on a finite interval, say [−1,1], while preserving certain intrinsic “shape” properties. To be specific we demand that the approximation process preserves properties of f, like its sign in all or part of the interval, its monotonicity, convexity, etc. We will refer to these properties as the shape of the function
Shape functions with embedded boundary conditions have been developed on the basis of invariant appr...
Shape preserving approximations are constructed by interpolating the data with polynomial splines of...
This paper is about the possibility of approximating a function f ∈ H∞(U), using only polynomials wh...
AbstractWe are going to survey recent developments and achievements in shape-preserving approximatio...
AbstractA review of shape preserving approximation methods and algorithms for approximating univaria...
In this paper are determined minimal shape-preserving projections onto the n-th degree algebraic pol...
The a i m of thi s paper is the description and the representation of shape functions...
AbstractIn the analysis of a finite element method (FEM) we can describe the shape of a given elemen...
AbstractWe analyze the degree of shape preserving weighted polynomial approximation for exponential ...
We construct multivariate polynomials attached to a function f ofm variables,m ≥ 2, which approximat...
In this paper, a particular shape preserving parametric polynomial approximation of conic sections i...
We present a new method for the construction of shape-preserving curves approximating a given set o...
AbstractThis paper studies shapes (curves and surfaces) which can be described by (piecewise) polyno...
This report deals with approximation of a given scattered univariate or bivariate data set that poss...
The planar shape (contour) of an object is a fundamental source of information in a pattern recognit...
Shape functions with embedded boundary conditions have been developed on the basis of invariant appr...
Shape preserving approximations are constructed by interpolating the data with polynomial splines of...
This paper is about the possibility of approximating a function f ∈ H∞(U), using only polynomials wh...
AbstractWe are going to survey recent developments and achievements in shape-preserving approximatio...
AbstractA review of shape preserving approximation methods and algorithms for approximating univaria...
In this paper are determined minimal shape-preserving projections onto the n-th degree algebraic pol...
The a i m of thi s paper is the description and the representation of shape functions...
AbstractIn the analysis of a finite element method (FEM) we can describe the shape of a given elemen...
AbstractWe analyze the degree of shape preserving weighted polynomial approximation for exponential ...
We construct multivariate polynomials attached to a function f ofm variables,m ≥ 2, which approximat...
In this paper, a particular shape preserving parametric polynomial approximation of conic sections i...
We present a new method for the construction of shape-preserving curves approximating a given set o...
AbstractThis paper studies shapes (curves and surfaces) which can be described by (piecewise) polyno...
This report deals with approximation of a given scattered univariate or bivariate data set that poss...
The planar shape (contour) of an object is a fundamental source of information in a pattern recognit...
Shape functions with embedded boundary conditions have been developed on the basis of invariant appr...
Shape preserving approximations are constructed by interpolating the data with polynomial splines of...
This paper is about the possibility of approximating a function f ∈ H∞(U), using only polynomials wh...