rmann定理及其在线性和非线性传热扩散问题中的应用

Harald M. Schöpf, P. Supancic
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引用次数: 18

摘要

本文利用 rmann定理给出了扩散型非线性偏微分方程解的紧解析近似。对于满足积分关系的解,如非线性传热的误差函数和热积分,展开解析函数的导数幂是一种有用的方法。在此基础上,构造了非线性方程解的级数展开式。通过引入依赖于附加参数的基函数,可以增强b rmann级数的收敛性,该参数由边界条件决定。一个非线性的例子,说明这种增强,嵌入到一个全面的介绍 rmann定理。除了初等情况下的递归格式外,还提出了一种基于整数划分的多值b rmann展开式和逆函数的快速算法。本方法有助于寻找优于常用泰勒级数的解析函数的展开式,并展示了如何将这些展开式应用于扩散型非线性偏微分方程。
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On Bürmann's Theorem and Its Application to Problems of Linear and Nonlinear Heat Transfer and Diffusion
This article presents a compact analytic approximation to the solution of a nonlinear partial differential equation of the diffusion type by using Bürmannʼs theorem. Expanding an analytic function in powers of its derivative is shown to be a useful approach for solutions satisfying an integral relation, such as the error function and the heat integral for nonlinear heat transfer. Based on this approach, series expansions for solutions of nonlinear equations are constructed. The convergence of a Bürmann series can be enhanced by introducing basis functions depending on an additional parameter, which is determined by the boundary conditions. A nonlinear example, illustrating this enhancement, is embedded into a comprehensive presentation of Bürmannʼs theorem. Besides a recursive scheme for elementary cases, a fast algorithm for multivalued Bürmann expansions and inverse functions is developed using integer partitions. The present approach facilitates the search for expansions of analytic functions superior to commonly used Taylor series and shows how to apply these expansions to nonlinear PDEs of the diffusion type.
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