A high-order accurate numerical quadrature algorithm is presented for the evaluation of integrals over curved surfaces and volumes which are defined implicitly via a fixed isosurface of a given function restricted to a given hyperrectangle. By converting the implicitly defined geometry into the graph of an implicitly defined height function, the approach leads to a recursive algorithm on the number of spatial dimensions which requires only one-dimensional root finding and one-dimensional Gaussian quadrature. The computed quadrature scheme yields strictly positive quadrature weights and inherits the high-order accuracy of Gaussian quadrature: a range of different convergence tests demonstrate orders of accuracy up to 20th order. Also present...
This note is about promoting singularity subtraction as a helpful tool in the discretization of sing...
We present a new approach for the numerical integration of arbitrary functions over polygonal ...
International audienceWe introduce a novel method to compute approximations of integrals over implic...
A high-order accurate numerical quadrature algorithm is presented for the evaluation of integrals ov...
A high-order quadrature algorithm is presented for computing integrals over curved surfaces and volu...
This paper describes a high order accurate method to calculate integrals over curved surfaces with b...
This paper introduces a novel method for the efficient and accurate computation of the volume of a d...
<p>We present numerical methods for the approximation of smooth, singular, and nearly singular integ...
We introduce a new method for the numerical integration over curved surfaces and volumes defined by ...
An innovative two-dimensional domain quadrature technique inherently sensitive to functions which de...
In this communication, we propose an efficient method to evaluate hypersingular integrals defined on...
AbstractThis paper describes a parallel high-order Discontinuous Galerkin method based on orthogonal...
Integral equation methods for the solution of partial differential equations, when coupled with suit...
Abstract. We derive and analyze high order discontinuous Galerkin methods for second-order elliptic ...
The quadrature error associated with a regular quadrature rule for evaluation of a layer potential i...
This note is about promoting singularity subtraction as a helpful tool in the discretization of sing...
We present a new approach for the numerical integration of arbitrary functions over polygonal ...
International audienceWe introduce a novel method to compute approximations of integrals over implic...
A high-order accurate numerical quadrature algorithm is presented for the evaluation of integrals ov...
A high-order quadrature algorithm is presented for computing integrals over curved surfaces and volu...
This paper describes a high order accurate method to calculate integrals over curved surfaces with b...
This paper introduces a novel method for the efficient and accurate computation of the volume of a d...
<p>We present numerical methods for the approximation of smooth, singular, and nearly singular integ...
We introduce a new method for the numerical integration over curved surfaces and volumes defined by ...
An innovative two-dimensional domain quadrature technique inherently sensitive to functions which de...
In this communication, we propose an efficient method to evaluate hypersingular integrals defined on...
AbstractThis paper describes a parallel high-order Discontinuous Galerkin method based on orthogonal...
Integral equation methods for the solution of partial differential equations, when coupled with suit...
Abstract. We derive and analyze high order discontinuous Galerkin methods for second-order elliptic ...
The quadrature error associated with a regular quadrature rule for evaluation of a layer potential i...
This note is about promoting singularity subtraction as a helpful tool in the discretization of sing...
We present a new approach for the numerical integration of arbitrary functions over polygonal ...
International audienceWe introduce a novel method to compute approximations of integrals over implic...