The quadrature error associated with a regular quadrature rule for evaluation of a layer potential increases rapidly when the evaluation point approaches the surface and the integral becomes nearly singular. Error estimates are needed to determine when the accuracy is insufficient and a more costly special quadrature method should be utilized. The final result of this paper are such quadrature error estimates for the composite Gauss-Legendre rule and the global trapezoidal rule, when applied to evaluate layer potentials defined over smooth curved surfaces in R3. The estimates have no unknown coefficients and can be efficiently evaluated given the discretization of the surface, invoking a local one-dimensional root-finding procedure. They ar...
Based on recently proposed non-singular contour-integral representations of single and double layer ...
Abstract. We present a simple, accurate method for computing singular or nearly sin-gular integrals ...
A high-order quadrature algorithm is presented for computing integrals over curved surfaces and volu...
In boundary integral methods it is often necessary to evaluate layer potentials on or close to the b...
International audienceWe present a simple and effective method for evaluating double- and single-lay...
This paper describes a high order accurate method to calculate integrals over curved surfaces with b...
Accurate evaluation of layer potentials near boundaries and interfaces are needed in many applicatio...
When solving elliptic boundary value problems using integral equation methods one may need to evalua...
<p>We present numerical methods for the approximation of smooth, singular, and nearly singular integ...
The method of moments (MoM) is used for the numerical solution of electromagnetic field integral equ...
International audienceAccurate evaluation of layer potentials near boundaries is needed in many appl...
Integral equation methods for the solution of partial differential equations, when coupled with suit...
A high-order accurate numerical quadrature algorithm is presented for the evaluation of integrals ov...
When solving partial differential equations using boundary integral equation methods, accurate evalu...
Abstract. Dense particulate flow simulations using integral equation methods demand accurate evaluat...
Based on recently proposed non-singular contour-integral representations of single and double layer ...
Abstract. We present a simple, accurate method for computing singular or nearly sin-gular integrals ...
A high-order quadrature algorithm is presented for computing integrals over curved surfaces and volu...
In boundary integral methods it is often necessary to evaluate layer potentials on or close to the b...
International audienceWe present a simple and effective method for evaluating double- and single-lay...
This paper describes a high order accurate method to calculate integrals over curved surfaces with b...
Accurate evaluation of layer potentials near boundaries and interfaces are needed in many applicatio...
When solving elliptic boundary value problems using integral equation methods one may need to evalua...
<p>We present numerical methods for the approximation of smooth, singular, and nearly singular integ...
The method of moments (MoM) is used for the numerical solution of electromagnetic field integral equ...
International audienceAccurate evaluation of layer potentials near boundaries is needed in many appl...
Integral equation methods for the solution of partial differential equations, when coupled with suit...
A high-order accurate numerical quadrature algorithm is presented for the evaluation of integrals ov...
When solving partial differential equations using boundary integral equation methods, accurate evalu...
Abstract. Dense particulate flow simulations using integral equation methods demand accurate evaluat...
Based on recently proposed non-singular contour-integral representations of single and double layer ...
Abstract. We present a simple, accurate method for computing singular or nearly sin-gular integrals ...
A high-order quadrature algorithm is presented for computing integrals over curved surfaces and volu...