Pointwise convergence of some boundary element methods. Part II
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Publication:3793674
DOI10.1051/m2an/1988220203431zbMath0648.65092OpenAlexW2473718128MaRDI QIDQ3793674
Wolfgang L. Wendland, Rolf Rannacher
Publication date: 1988
Published in: ESAIM: Mathematical Modelling and Numerical Analysis (Search for Journal in Brave)
Full work available at URL: https://eudml.org/doc/193533
uniform convergenceboundary element methodconvergence estimatesfinite element Galerkin methodpointwise convergence estimatesspline collocation boundary elementsstrongly elliptic boundary integro-differential equations
Related Items
Local convergence of the boundary element method on polyhedral domains ⋮ Non-polynomial spline alternatives in isogeometric symmetric Galerkin BEM ⋮ The computation of potentials near and on the boundary by an extraction technique for boundary element methods ⋮ APPLICATION OF COLLOCATION BEM FOR AXISYMMETRIC TRANSMISSION PROBLEMS IN ELECTRO- AND MAGNETOSTATICS
Cites Work
- The convergence of Galerkin and collocation methods with splines for pseudodifferential equations on closed curves
- The convergence of spline collocation for strongly elliptic equations on curves
- A direct boundary integral equation method for transmission problems
- Integral equations with non integrable kernels
- Über die punktweise Konvergenz finiter Elemente
- A finite element method for some integral equations of the first kind
- Punktweise Konvergenz der Methode der finiten Elemente beim Plattenproblem
- Pseudo-differential operators and non-elliptic boundary problems
- Approximation in the finite element method
- On the Asymptotic Convergence of Collocation Methods
- A Finite Element Collocation Method for Singular Integral Equations
- On the order of pointwise convergence of some boundary element methods. Part I. Operators of negative and zero order
- Strong ellipticity of boundary integral operators.
- An integral equation of the first kind for a free boundary value problem of the stationary Stokes' equations
- On nonconforming an mixed finite element methods for plate bending problems. The linear case
- A finite element method for the double‐layer potential solutions of the Neumann exterior problem
- Some Optimal Error Estimates for Piecewise Linear Finite Element Approximations
- Optimal L ∞ Estimates for the Finite Element Method on Irregular Meshes
- Layer potentials and acoustic diffraction
- Maximum Norm Estimates in the Finite Element Method on Plane Polygonal Domains. Part 1
- Numerical Solution of an Exterior Neumann Problem Using a Double Layer Potential
- The normal dervative of the double layer potential on polygons and galerkin approximation
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