Two approaches to deriving the interpolation theorem for narrow quadrilateral isoparametric finite elements not satisfying the condition rho(k)/h(k) greater than or equal to rho(0) > 0, rho(k) and h(k) being the radius of inscribed circle and the diameter of the quadrilateral K, respectively, are presented. The first one, using the Bramble-Hilbert lemma, is successful only in deriving the L(2)(K)-estimate. The nonapplicability of the standard approach via the Bramble-Hilbert lemma in the case of H-1(K)-estimate is presented and a fully efficient method giving the optimum rate of convergence O(h) in the H-1(K)-norm is described. In the end, the dependence of the interpolation error on the geometry of a quadrilateral is demonstrated by an exa...
We consider Lagrange interpolation involving trigonometric polynomials of degree ≦N in one space dir...
A note on anisotropic interpolation error estimates for isoparametric quadrilateral nite elements Pr...
We show that ∥u ∥ ≤C∥u∥ , where Ω is a bounded polygonal domain in R , 0\u3cε\u3c(1/2), u is the p...
Two approaches to deriving the interpolation theorem for narrow quadrilateral isoparametric finite e...
AbstractTwo approaches to deriving the interpolation theorem for narrow quadrilateral isoparametric ...
The interpolation theorem for convex quadrilateral isoparametric finite elements is proved in the ca...
Abstract. In this paper, we study the relation between the error estimate of the bilinear interpolat...
AbstractThe Bramble-Hilbert lemma is a useful tool for proving error bounds for multivariate interpo...
Anisotropic local interpolation error estimates are derived for quadrilateral and hexahedral Lagrang...
summary:Interpolation on finite elements usually occurs in a Hilbert space setting, which means that...
The quality of finite element solutions is improved by optimizing the location of the nodes within a...
Abstract. Optimal order error estimates in H1, for the Q1 isoparametric interpolation, were obtained...
We study W1,p Lagrange interpolation error estimates for general quadrilateral Qk finite elements wi...
This paper deals with the numerical approximation of the bending of a plate modeled by Reissner-Mind...
In this paper we introduce the semiregularity property for a family of decompositions of a polyhedro...
We consider Lagrange interpolation involving trigonometric polynomials of degree ≦N in one space dir...
A note on anisotropic interpolation error estimates for isoparametric quadrilateral nite elements Pr...
We show that ∥u ∥ ≤C∥u∥ , where Ω is a bounded polygonal domain in R , 0\u3cε\u3c(1/2), u is the p...
Two approaches to deriving the interpolation theorem for narrow quadrilateral isoparametric finite e...
AbstractTwo approaches to deriving the interpolation theorem for narrow quadrilateral isoparametric ...
The interpolation theorem for convex quadrilateral isoparametric finite elements is proved in the ca...
Abstract. In this paper, we study the relation between the error estimate of the bilinear interpolat...
AbstractThe Bramble-Hilbert lemma is a useful tool for proving error bounds for multivariate interpo...
Anisotropic local interpolation error estimates are derived for quadrilateral and hexahedral Lagrang...
summary:Interpolation on finite elements usually occurs in a Hilbert space setting, which means that...
The quality of finite element solutions is improved by optimizing the location of the nodes within a...
Abstract. Optimal order error estimates in H1, for the Q1 isoparametric interpolation, were obtained...
We study W1,p Lagrange interpolation error estimates for general quadrilateral Qk finite elements wi...
This paper deals with the numerical approximation of the bending of a plate modeled by Reissner-Mind...
In this paper we introduce the semiregularity property for a family of decompositions of a polyhedro...
We consider Lagrange interpolation involving trigonometric polynomials of degree ≦N in one space dir...
A note on anisotropic interpolation error estimates for isoparametric quadrilateral nite elements Pr...
We show that ∥u ∥ ≤C∥u∥ , where Ω is a bounded polygonal domain in R , 0\u3cε\u3c(1/2), u is the p...