This paper is concerned with a study of approximation order and construction of locally supported elements for the space S41 (Δ) of Cl quartic pp (piecewise polynomial) functions on a triangulation Δ of a connected polygonal domain Ω in R2. It is well known that, when Δ is a three-directional mesh Δ(1), the order of approximation of S41(Δ(1)) is only 4, not 5. Though a local Clough-Tocher refinement procedure of an arbitrary triangulation A yields the optimal (fifth) order of approximation from the space S41(Δ) (see [1]), it needs more data points in addition to the vertex set of the triangulation A. In this paper, we will introduce a particular mixed three-directional mesh Δ(3)) and construct so-called mixed three-directional elements. We ...
Given a function f defined on a bounded domain Ω IR2 and a number N> 0, we study the properties ...
summary:We study the problem of Lagrange interpolation of functions of two variables by quadratic po...
For any triangulation of a given polygonal region, consider the piecewise linear least squares appro...
This paper is concerned with a study of approximation order and construction of locally supported el...
AbstractThis paper is concerned with a study of approximation order and construction of locally supp...
This paper is concerned with a study of approximation order and construction of locally supported el...
AbstractLet Δ denote the triangulation of the plane obtained by multi-integer translates of the four...
AbstractIt is shown that the approximation order from bivariate piecewise polynomials of degree ≤k i...
Introduction It is the purpose of this note to show that the approximation order from the space \Pi...
Abstract. We describe a new scheme based on quadratic C1-splines on type-2 triangulations approximat...
Let be a triangulation of some polygonal domain f c R2 and let S9 (A) denote the space of all bivari...
AbstractLet S denote the space of bivariate piecewise polynomial functions of degree ⩽ k and smoothn...
We study the optimal order of approximation for Ckpiecewise analytic functions (cf. Definition 1.2) ...
We study the optimal order of approximation for C-k piecewise analytic functions (cf. Definition 1.2...
Given a function f defined on a bounded polygonal domain Ω ⊂ IR2 and a number N> 0, we study the ...
Given a function f defined on a bounded domain Ω IR2 and a number N> 0, we study the properties ...
summary:We study the problem of Lagrange interpolation of functions of two variables by quadratic po...
For any triangulation of a given polygonal region, consider the piecewise linear least squares appro...
This paper is concerned with a study of approximation order and construction of locally supported el...
AbstractThis paper is concerned with a study of approximation order and construction of locally supp...
This paper is concerned with a study of approximation order and construction of locally supported el...
AbstractLet Δ denote the triangulation of the plane obtained by multi-integer translates of the four...
AbstractIt is shown that the approximation order from bivariate piecewise polynomials of degree ≤k i...
Introduction It is the purpose of this note to show that the approximation order from the space \Pi...
Abstract. We describe a new scheme based on quadratic C1-splines on type-2 triangulations approximat...
Let be a triangulation of some polygonal domain f c R2 and let S9 (A) denote the space of all bivari...
AbstractLet S denote the space of bivariate piecewise polynomial functions of degree ⩽ k and smoothn...
We study the optimal order of approximation for Ckpiecewise analytic functions (cf. Definition 1.2) ...
We study the optimal order of approximation for C-k piecewise analytic functions (cf. Definition 1.2...
Given a function f defined on a bounded polygonal domain Ω ⊂ IR2 and a number N> 0, we study the ...
Given a function f defined on a bounded domain Ω IR2 and a number N> 0, we study the properties ...
summary:We study the problem of Lagrange interpolation of functions of two variables by quadratic po...
For any triangulation of a given polygonal region, consider the piecewise linear least squares appro...