本程序求解第一类边界条件下无源矩形金属槽电位分布。
The procedure for solving the first boundary condition of passive rectangular metal trough potential distribution .
然后利用拉格朗日乘子法,吸收第一类边界条件,从而得出其广义变分原理;
Then its generalized variational principle is established on the basis of Lagrange multiplier method by absorbing the first kind of boundary condition.
第一类边界条件、第二类边界条件和第三类边界条件很容易的引入该算法无需特殊处理。
The first boundary condition, the second boundary condition and the third category boundary conditions would be very easy to introduce the algorithm without special treatment.
本文针对一维多孔介质的第一类边界条件,对高强度快速干燥条件下热质交换的普遍微分方程组进行求解。
In this paper, heat and mass transfer under the first boundary condition during high intensive and rapid drying process is analysed and the general differential equation group is resolved.
获得了以该介质为蓄冷媒介的蓄冷平板在第一类边界条件下凝固时的相界面移动规律、板内温度分布及预测蓄冷时间等参数。
The motion of phase interface, the temperature distribution and the thermal storage time of the cool storage slab under the first boundary condition were obtained.
根据边值问题的唯一性原理,由此积分解表达式给出了第一类和第二类边界条件的积分解表达式。
According to uniqueness theorem, the integral formulations of the first class boundary condition and the second class boundary condition are given form the above integral formulation.
根据边值问题的唯一性原理,由此积分解表达式给出了第一类和第二类边界条件的积分解表达式。
According to uniqueness theorem, the integral formulations of the first class boundary condition and the second class boundary condition are given form the above integral formulation.
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