曲线各向异性介质热传导的格林函数计算

IF 2.8 Q2 THERMODYNAMICS
Heat Transfer Pub Date : 2024-08-12 DOI:10.1002/htj.23141
Anatoli M. Frishman, Stephen D. Holland
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引用次数: 0

摘要

解决热传导的逆问题往往需要进行大量的格林函数求值。本文探讨了各向异性曲面介质(如复合材料薄片)中格林函数的计算,在这种介质中,导热主轴沿着曲面。我们从圆柱形凸面和凹面的既定精确序列解开始。这些解法可扩展到现实世界中不形成圆柱等封闭表面的复合材料几何形状。遗憾的是,精确解具有无穷级数和或积分的形式,对于感兴趣的逆问题,尤其是大曲率半径问题,在计算上是不可行的。这就需要一种在曲率半径较大时既精确又有效计算的扰动解法。此外,它还激发了一种现象学近似方法,这种方法在广泛的曲率范围内具有极高的计算效率,但在一定程度上牺牲了精确度。我们将这些解与精确解、相互解以及有限差分数值计算进行了比较。我们确定了参数空间中不同方法更可取的区域,以及它们导致相同数值结果的区域。
本文章由计算机程序翻译,如有差异,请以英文原文为准。

Calculation of Green's functions for heat conduction in curved anisotropic media

Calculation of Green's functions for heat conduction in curved anisotropic media

Solving the inverse problems of heat conduction often requires performing a very large number of Green's function evaluations. This paper addresses the calculation of Green's functions in anisotropic curved media, such as composite lamina, where the principal axes of thermal conductivity follow the curved surface. We start with established exact series solutions for cylindrical convex and concave shapes. These solutions are extended to accommodate geometries of real-world composite materials that do not form a closed surface like a cylinder. Unfortunately, the exact solutions have the form of an infinite series of sums or integrals and are computationally infeasible for the inverse problems of interest, especially for large radii of curvature. This motivates a perturbation solution that is accurate and computationally efficient at large radii of curvature. In addition, it motivates a phenomenological approximation that is extremely computationally efficient over a broad range of curvatures, but with some sacrifice in accuracy. These solutions are compared with exact solutions, with each other, and with numerical finite difference calculation. We identify regions in parameter space where the different approaches are preferable and where they lead to the same numerical result.

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来源期刊
Heat Transfer
Heat Transfer THERMODYNAMICS-
CiteScore
6.30
自引率
19.40%
发文量
342
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