AbstractIn this report, we construct correction coefficients to obtain high-order trapezoidal quadrature rules to evaluate two-dimensional integrals with a logarithmic singularity of the form where the domain D is a square containing the point of singularity (0,0) and v is a C∞ function defined on the whole plane R2. The procedure we use is a generalization to 2-D of the method of central corrections for logarithmic singularities described in [1]. As in 1-D, the correction coefficients are independent of the number of sampling points used to discretize the square D. When v has compact support contained in D, the approximation is the trapezoidal rule plus a local weighted sum of the values of v around the point of singularity. These quadrat...
The paper studied the integration of logarithmic singularity problem J(ӯ) = ∫∫Δζ(ӯ)log|ӯ - ӯ 0∗|dA, ...
Sometimes it is necessary to obtain a numerical integration using only discretised data. In some cas...
AbstractThis paper is concerned with the numerical integration of functions by piecewise polynomial ...
AbstractIn this report, we construct correction coefficients to obtain high-order trapezoidal quadra...
AbstractWe construct correction coefficients for high-order trapezoidal quadrature rules to evaluate...
We present a family of high order trapezoidal rule-based quadratures for a class of singular integra...
AbstractA group of quadrature formulae for end-point singular functions is presented generalizing cl...
AbstractTwo transformation methods are extended to the numerical evaluation of two dimensional singu...
AbstractA numerical integration method that has rapid convergence for integrands with known singular...
Quadrature rules for evaluating singular integrals that typically occur in the boundary element meth...
In many applied problems, efficient calculation of quadratures with high accuracy is required. The e...
It is well known that the trapezoidal rule converges geometrically when applied to analytic function...
A method for constructing the exact quadratures for Müntz and Müntz-logarithmic polynomials is prese...
The error in the trapezoidal rule quadrature formula can be attributed to discretization in the inte...
AbstractWe treat the theory of numerical quadrature over a square using an m2 copy Q(m)ƒ of a one-po...
The paper studied the integration of logarithmic singularity problem J(ӯ) = ∫∫Δζ(ӯ)log|ӯ - ӯ 0∗|dA, ...
Sometimes it is necessary to obtain a numerical integration using only discretised data. In some cas...
AbstractThis paper is concerned with the numerical integration of functions by piecewise polynomial ...
AbstractIn this report, we construct correction coefficients to obtain high-order trapezoidal quadra...
AbstractWe construct correction coefficients for high-order trapezoidal quadrature rules to evaluate...
We present a family of high order trapezoidal rule-based quadratures for a class of singular integra...
AbstractA group of quadrature formulae for end-point singular functions is presented generalizing cl...
AbstractTwo transformation methods are extended to the numerical evaluation of two dimensional singu...
AbstractA numerical integration method that has rapid convergence for integrands with known singular...
Quadrature rules for evaluating singular integrals that typically occur in the boundary element meth...
In many applied problems, efficient calculation of quadratures with high accuracy is required. The e...
It is well known that the trapezoidal rule converges geometrically when applied to analytic function...
A method for constructing the exact quadratures for Müntz and Müntz-logarithmic polynomials is prese...
The error in the trapezoidal rule quadrature formula can be attributed to discretization in the inte...
AbstractWe treat the theory of numerical quadrature over a square using an m2 copy Q(m)ƒ of a one-po...
The paper studied the integration of logarithmic singularity problem J(ӯ) = ∫∫Δζ(ӯ)log|ӯ - ӯ 0∗|dA, ...
Sometimes it is necessary to obtain a numerical integration using only discretised data. In some cas...
AbstractThis paper is concerned with the numerical integration of functions by piecewise polynomial ...