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Laplace Equation Inside a Cylinder: Computational Analysis and Asymptotic Behavior of the Solution

机译：圆柱体内的拉普拉斯方程：计算分析和解的渐近行为

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The Laplacian in the cylindrical coordinate space has been considered to approximate the solution of a conservative field within a restricted domain.rnδ~2ψ/δp~2δ+1/p δψ/δp+1/p~2 δ~2ψ/ψφ~2+φ~2ψ/ψz~2=0rnSolutions of the Laplacian are represented by expansion in series of the appropriate orthonormal functions. By using asymptotic relations of Bessel Series and Fourier Bessel series, we establish some criteria for the solution to properly reflect the nature of the conservative field.

机译：圆柱坐标空间中的拉普拉斯算子被认为近似于受限域内保守场的解。rnδ〜2ψ/δp〜2δ+ 1 / pδψ/δp+ 1 / p〜2δ〜2ψ/ψφ〜2 +φ〜2ψ/ψz〜2 = 0rn拉普拉斯算子的解由一系列适当的正交函数的展开表示。通过使用Bessel级数和Fourier Bessel级数的渐近关系，我们为解决方案建立了一些标准，以正确反映保守场的性质。

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来源
《Computer mathematics》|2007年|179-187|共9页
会议地点 Singapore(SG);Singapore(SG)
作者
Suvra Sarkar; Sougata Patra;
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作者单位

Department of Electronics and Communication Engineering Haldia Institute of TechnologyIndian Centre for Advancement in Research and Education Haldia, West Bengal;

Department of Electronics and Communication Engineering Haldia Institute of TechnologyIndian Centre for Advancement in Research and Education Haldia, West Bengal;

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会议组织
原文格式 PDF
正文语种 eng
中图分类计算技术、计算机技术;
关键词
bessel functions; fourier-bessel series; kronecker delta; laplace equation;

机译：贝塞尔函数傅里叶-贝塞尔级数；克罗内克三角洲拉普拉斯方程;

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Laplace Equation Inside a Cylinder: Computational Analysis and Asymptotic Behavior of the Solution

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