在考虑零点振动能后提出了一个速率常数的统计表达式,与实验结果符合很好。
A statistical expression of the late constant was raised, in which the zero point energy was considered, and the calculated results were in a good agreement with the experimental.
解离能计算进行了零点振动能(ZPVE)校正,并运用完全均衡校正法对基函数重叠误差(BSSE)进行校正。
For dissociation energy, zero point vibration energy (ZPVE) is calculated and basis set superposition error (BSSE) is corrected by counterpoise method.
通过构造多项式序列的方法,建立了非线性时滞方程的解的零点分布,给出了较为广泛的振动条件。
The distribution of zeros for nonlinear differential equations with positive arguments by method of polynomial series, and some more explicit conditions to oscillate are given.
通过振动分析对平衡态和过渡态进行了验证,并得到了零点能。
The equilibrium states and the transition state have been verified according to the number of imaginary frequency through vibrational analysis.
通过振动分析对平衡态和过渡态进行了验证,并得到了零点能。
The equilibrium states and the transition state have been verified according to the number of imaginary frequency through vibrational analysis.
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