In this note, singular integration problems of the form Hα (h) = ∫Ω∫ h(x,y)/|-x0|2-α dA, 0 ≤ α ≤ 1, where Ω = [x0,y0] × [b1, b2], x= (x,y) ϵ Ω and fixed point x 0 = (x0,y0) ϵ Ω is considered. The density function h(x, y) is assumed given, continuous and smooth on the rectangle Ω and belong to the class of functions C2,α(Ω). Cubature formula for double integrals with algebraic singularity on a rectangle is constructed using the modified spline function SΩ(P) of type (0, 2). Highly accurate numerical results for the proposed method is given for both tested density function h(x, y) as linear, quadratic and absolute value functions. The results are in line with the theoretical findings
. Originally, Tchebycheffian B-splines have been defined by generalized divided differences. In this...
AbstractIn this paper product quadrature rules, based on cubic spline interpolation, are obtained fo...
AbstractIn the univariate case, there is a well-developed theory on the error estimation of the quad...
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The research work studied the singular integration problems of the form. The density function h(x, y...
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The paper deals with the construction of an efficient quadrature formula for singular integrals (SI)...
Keywords. Double integrals; numerical integration; product rules. Double integrals of the form ∫ 1...
This dissertation applies the approximation methods of the cubic spline and the bicubic s...
From interpolation formulas for the function of two arguments, general expressions for the double de...
Stratified cubature rules are proposed to approximate double integrals defined on the real positive ...
The paper deals with the approximation of integrals of the type I(f;t)=â«Df(x)K(x,t)w(x)dx,x=(x1,x2)...
In this paper we present a new class of cubature rules with the aim of accurately integrating weakly...
. Originally, Tchebycheffian B-splines have been defined by generalized divided differences. In this...
AbstractIn this paper product quadrature rules, based on cubic spline interpolation, are obtained fo...
AbstractIn the univariate case, there is a well-developed theory on the error estimation of the quad...
The paper studied the integration of logarithmic singularity problem J(ӯ) = ∫∫Δζ(ӯ)log|ӯ - ӯ 0∗|dA, ...
The research work studied the singular integration problems of the form. The density function h(x, y...
AbstractThe method of constructing minimal cubature rules with high algebraic degrees of exactness i...
New quadrature formulas (QFs) for evaluating the singular integral (SI) of Cauchy type with unbounde...
AbstractWe present five new cubature formula in the triangle and square for exact integration of pol...
The paper deals with the construction of an efficient quadrature formula for singular integrals (SI)...
Keywords. Double integrals; numerical integration; product rules. Double integrals of the form ∫ 1...
This dissertation applies the approximation methods of the cubic spline and the bicubic s...
From interpolation formulas for the function of two arguments, general expressions for the double de...
Stratified cubature rules are proposed to approximate double integrals defined on the real positive ...
The paper deals with the approximation of integrals of the type I(f;t)=â«Df(x)K(x,t)w(x)dx,x=(x1,x2)...
In this paper we present a new class of cubature rules with the aim of accurately integrating weakly...
. Originally, Tchebycheffian B-splines have been defined by generalized divided differences. In this...
AbstractIn this paper product quadrature rules, based on cubic spline interpolation, are obtained fo...
AbstractIn the univariate case, there is a well-developed theory on the error estimation of the quad...