Transformation of Duhamel's Integral in the Inverse Heat Conduction Problem

概要

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Since the surface temperature is considered as a continuous function of time, Duhamel's integral can be transformed in to an equation which contains an unknown surface temperature and its derivatives. From the transformed equation, the surface temperature and the surface heat flux can be expressed by the interior temperature and its derivatives when the interior point is adiabatic end. When full information on the interior temperature is available, these description gives exact surface conditions. Even when full information on the interior temperature is not available, however, the description represents the surface conditions except for a small time interval followed by a discontinuous change of surface temperature.
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