This paper describes a high order accurate method to calculate integrals over curved surfaces with boundaries. Given data locations that are arbitrarily distributed over the surface, together with some functional description of the surface and its boundary, the algorithm produces matching quadrature weights. This extends on the authors\u27 earlier methods for integrating over the surface of a sphere and over arbitrarily shaped smooth closed surfaces by also considering domain boundaries. The core approach consists again of combining RBF-FD (radial basis function-generated finite difference) approximations for curved surface triangles, which together make up the full surface. The provided examples include both curved and flat domains. In the...
In this paper, we consider the evaluation of surface integrals over piecewise smooth surfaces in thr...
A general program is developed to generate finite element mesh over curved surfaces. The domain to b...
<p>We present numerical methods for the approximation of smooth, singular, and nearly singular integ...
A high-order accurate numerical quadrature algorithm is presented for the evaluation of integrals ov...
This paper presents a numerical integration formula for the evaluation of where and is any curved do...
A Radial Basis Function Generated Finite-Differences (RBF-FD) inspired technique for evaluating defi...
The numerical approximation of denite integrals, or quadrature, often involves the construction of a...
This paper presents a new approach to computing 1=r singularities on curved panels. By using careful...
A high-order quadrature algorithm is presented for computing integrals over curved surfaces and volu...
<p>Python implementation of the algorithm described in J. A. Reeger, B. Fornberg, and M. L. Watts "N...
Many applications in geomathematics as well as bio-medical applications require the analysis of an u...
We introduce a new method for the numerical integration over curved surfaces and volumes defined by ...
The quadrature error associated with a regular quadrature rule for evaluation of a layer potential i...
Julia implementation of the algorithm described in J. A. Reeger, B. Fornberg, and M. L. Watts "Numer...
We present a new approach for the numerical integration of arbitrary functions over polygonal ...
In this paper, we consider the evaluation of surface integrals over piecewise smooth surfaces in thr...
A general program is developed to generate finite element mesh over curved surfaces. The domain to b...
<p>We present numerical methods for the approximation of smooth, singular, and nearly singular integ...
A high-order accurate numerical quadrature algorithm is presented for the evaluation of integrals ov...
This paper presents a numerical integration formula for the evaluation of where and is any curved do...
A Radial Basis Function Generated Finite-Differences (RBF-FD) inspired technique for evaluating defi...
The numerical approximation of denite integrals, or quadrature, often involves the construction of a...
This paper presents a new approach to computing 1=r singularities on curved panels. By using careful...
A high-order quadrature algorithm is presented for computing integrals over curved surfaces and volu...
<p>Python implementation of the algorithm described in J. A. Reeger, B. Fornberg, and M. L. Watts "N...
Many applications in geomathematics as well as bio-medical applications require the analysis of an u...
We introduce a new method for the numerical integration over curved surfaces and volumes defined by ...
The quadrature error associated with a regular quadrature rule for evaluation of a layer potential i...
Julia implementation of the algorithm described in J. A. Reeger, B. Fornberg, and M. L. Watts "Numer...
We present a new approach for the numerical integration of arbitrary functions over polygonal ...
In this paper, we consider the evaluation of surface integrals over piecewise smooth surfaces in thr...
A general program is developed to generate finite element mesh over curved surfaces. The domain to b...
<p>We present numerical methods for the approximation of smooth, singular, and nearly singular integ...