AUTOMATIC QUADRATURE SCHEME FOR CAUCHY TYPE SINGULAR INTEGRAL ON THE VARIABLE INTERVAL

Z. K. Eshkuvatov, Ismail Ahmad Al-Qasem Al-Hadi, S. Bahramov
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引用次数: 1

Abstract

In this note, we consider the product indefinite integral of the form                             An automatic quadrature scheme (AQS) is constructed for evaluating Cauchy principal singular integrals in two cases. In the first case c∈ [y,z] ⊂ [-1,1] where -1 < y < z < 1, density function h(t) is approximated by the truncated sum of Chebyshev polynomials of the first kind. Direct substitution does not give solutions so we have used the AQS and reduced problems into algebraic equation with unknown parameters bk which can be found in terms of the singular point with some front conditions. In the second case c ∈ [-1,1], the application of the AQS reduced the number of calculations twice and accuracy is increased. As a theoretical result, the convergence theorem of the proposed method is proven in a Hilbert space. Numerical examples with exact solutions and comparisons with other methods are also given, and they are in the line with theoretical findings.
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变区间上柯西型奇异积分的自动求积分方案
本文考虑了以下形式的积不定积分:为求两种情况下的柯西主奇异积分,构造了一个自动正交格式(AQS)。在第一种情况下,c∈[y,z]∧[-1,1]其中-1 < y < z < 1,密度函数h(t)近似为第一类切比雪夫多项式的截断和。由于直接代换不能给出解,所以我们利用AQS将问题化简为具有未知参数bk的代数方程,该方程可以用具有一定前条件的奇点来求解。在第二种情况c∈[-1,1]中,AQS的应用使计算次数减少了两倍,提高了精度。理论结果证明了该方法在Hilbert空间中的收敛性定理。给出了精确解的数值算例,并与其他方法进行了比较,结果与理论结果一致。
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CiteScore
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发文量
20
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