summary:We consider the error analysis of Lagrange interpolation on triangles and tetrahedrons. For Lagrange interpolation of order one, Babuška and Aziz showed that squeezing a right isosceles triangle perpendicularly does not deteriorate the optimal approximation order. We extend their technique and result to higher-order Lagrange interpolation on both triangles and tetrahedrons. To this end, we make use of difference quotients of functions with two or three variables. Then, the error estimates on squeezed triangles and tetrahedrons are proved by a method that is a straightforward extension of the original one given by Babuška-Aziz
Abstract. Optimal order error estimates in H1, for the Q1 isoparametric interpolation, were obtained...
Interpolation error estimates in terms of geometric quality measures are established for harmonic co...
Abstract New estimates are established for the error between a function and its linear interpolant o...
summary:We consider the error analysis of Lagrange interpolation on triangles and tetrahedrons. For ...
summary:We present the error analysis of Lagrange interpolation on triangles. A new a priori error e...
summary:We study the problem of Lagrange interpolation of functions of two variables by quadratic po...
We study the optimal order of approximation for Ckpiecewise analytic functions (cf. Definition 1.2) ...
AbstractThis paper establishes the fine and rough theory of Lagrange type interpolation of higher or...
AbstractIn this paper we study the quantities [formula] which define error bounds for the approximat...
The interpolation errors of the higher order bivariate Lagrange polynomial interpolation based on th...
We study the optimal order of approximation for C-k piecewise analytic functions (cf. Definition 1.2...
AbstractAn average interpolation is introduced for 3-rectangles and tetrahedra, and optimal order er...
AbstractIn this note, by analyzing the interpolation operator of Girault and Raviart given in [V. Gi...
Abstract. We prove optimal order error estimates for the Raviart-Thomas inter-polation of arbitrary ...
AbstractIt is shown that for any n + 1 times continuously differentiable function f and any choice o...
Abstract. Optimal order error estimates in H1, for the Q1 isoparametric interpolation, were obtained...
Interpolation error estimates in terms of geometric quality measures are established for harmonic co...
Abstract New estimates are established for the error between a function and its linear interpolant o...
summary:We consider the error analysis of Lagrange interpolation on triangles and tetrahedrons. For ...
summary:We present the error analysis of Lagrange interpolation on triangles. A new a priori error e...
summary:We study the problem of Lagrange interpolation of functions of two variables by quadratic po...
We study the optimal order of approximation for Ckpiecewise analytic functions (cf. Definition 1.2) ...
AbstractThis paper establishes the fine and rough theory of Lagrange type interpolation of higher or...
AbstractIn this paper we study the quantities [formula] which define error bounds for the approximat...
The interpolation errors of the higher order bivariate Lagrange polynomial interpolation based on th...
We study the optimal order of approximation for C-k piecewise analytic functions (cf. Definition 1.2...
AbstractAn average interpolation is introduced for 3-rectangles and tetrahedra, and optimal order er...
AbstractIn this note, by analyzing the interpolation operator of Girault and Raviart given in [V. Gi...
Abstract. We prove optimal order error estimates for the Raviart-Thomas inter-polation of arbitrary ...
AbstractIt is shown that for any n + 1 times continuously differentiable function f and any choice o...
Abstract. Optimal order error estimates in H1, for the Q1 isoparametric interpolation, were obtained...
Interpolation error estimates in terms of geometric quality measures are established for harmonic co...
Abstract New estimates are established for the error between a function and its linear interpolant o...