As is known [4]. the $C^o$ Galerkin solution of a two-point boundary problem using piecewise polynomial functions, has O($h^{2k}$ ) convergence at the knots, where $k$ is the degree of the finite element space. Also, it can be proved [5] that at specific interior points, the Gauss-Legendre points the gradient has O($h^{k+1}$) convergence, instead of O($h^k$). In this note, it is proved that on any segment there are $k–1$ interior points where the Galerkin solution is of O($h^{k+2}$), one order better than the global order of convergence. These points are the Lobatto points
AbstractA Galerkin finite element method that uses piecewise bilinears on a simple piecewise equidis...
In this paper, we consider a collocation-$ H^{-1} $-Galerkin approximation for the elliptic boundary...
We describe a Galerkin method with special basis functions for a class of singular two-point boundar...
As is known [4]. the $C^o$ Galerkin solution of a two-point boundary problem using piecewise polynom...
In the case of one-dimensional Galerkin methods the phenomenon of superconvergence at the knots has ...
For parabolic equations in one space variable with a strongly coercive self-adjoint $2m$th order spa...
http://deepblue.lib.umich.edu/bitstream/2027.42/8206/5/bam4534.0001.001.pdfhttp://deepblue.lib.umich...
We prove the optimal convergence of a discontinuous-Galerkin-based immersed boundary method introdu...
We describe a Galerkin method with special basis functions for a class of singular two-point boundar...
AbstractIn this paper finite element Galerkin methods are developed for spaces of piecewise polynomi...
The classical Ritz-Galerkin method is applied to a linear, second-order, self-adjoint boundary value...
summary:The superconvergence property of a certain external method for solving two point boundary va...
For two-point boundary value problems in weak formulation with piecewise constant coefficients an...
For two-point boundary value problems in weak formulation with piecewise constant coefficients and p...
We consider a class of second-kind integral equations in which the operator is not compact. These ma...
AbstractA Galerkin finite element method that uses piecewise bilinears on a simple piecewise equidis...
In this paper, we consider a collocation-$ H^{-1} $-Galerkin approximation for the elliptic boundary...
We describe a Galerkin method with special basis functions for a class of singular two-point boundar...
As is known [4]. the $C^o$ Galerkin solution of a two-point boundary problem using piecewise polynom...
In the case of one-dimensional Galerkin methods the phenomenon of superconvergence at the knots has ...
For parabolic equations in one space variable with a strongly coercive self-adjoint $2m$th order spa...
http://deepblue.lib.umich.edu/bitstream/2027.42/8206/5/bam4534.0001.001.pdfhttp://deepblue.lib.umich...
We prove the optimal convergence of a discontinuous-Galerkin-based immersed boundary method introdu...
We describe a Galerkin method with special basis functions for a class of singular two-point boundar...
AbstractIn this paper finite element Galerkin methods are developed for spaces of piecewise polynomi...
The classical Ritz-Galerkin method is applied to a linear, second-order, self-adjoint boundary value...
summary:The superconvergence property of a certain external method for solving two point boundary va...
For two-point boundary value problems in weak formulation with piecewise constant coefficients an...
For two-point boundary value problems in weak formulation with piecewise constant coefficients and p...
We consider a class of second-kind integral equations in which the operator is not compact. These ma...
AbstractA Galerkin finite element method that uses piecewise bilinears on a simple piecewise equidis...
In this paper, we consider a collocation-$ H^{-1} $-Galerkin approximation for the elliptic boundary...
We describe a Galerkin method with special basis functions for a class of singular two-point boundar...