The aim of this thesis is to study the Regularization Method for stable solution of two inverse heat conduction problems and study their numerical implements.
本文旨在研究获得两个逆热传导问题稳定解的正则化方法及其数值实现问题。
To obtain a stable solution, in our method, successive approximation process is constrained by prior histogram and laplacian regularization.
为了获得稳定而满意的解,我们采用直方图约束下的正则化方法对连续近似迭代进行约束。
The exact expression for the solution and stable numerical algorithm are given based on the reproducing kernel method.
基于再生核方法,温度分布的精确表达式和稳定的数值算法被给出。
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