因此,微正则系综与正则系综的等价性在统计中仍然成立。
Therefore, the equivalence between the microcanonical ensemble and canonical ensemble still holds in statistics.
应用吉布斯正则系综导出了玻耳兹曼分布律。
This paper is an application of Gibbs canonical ensemble to the derivation of Boltzmann Distribution law.
本文研究了微正则系综,正则系综和巨正则系综中网络的统计性质。
The network properties of a micro-canonical ensemble, canonical ensemble and grand canonical ensemble are studied.
利用量子正则系综理论研究了介观rlc电路在混合态下的量子涨落。
By making use of the quantum canonic ensemble theory, the quantum fluctuations of a mesoscopic RLC circuit in the mixed state have been studied.
因此可知,在Tsallis统计基础下微正则系综与正则系综的等价性理论仍然是成立的。
Therefore, the equivalence between the microcanonical ensemble and canonical ensemble still holds in Tsallis statistics.
应用统计热力学巨正则系综的密度涨落理论,提出了确定均质沸腾中液体极限过热度和均质凝结中蒸汽极限过冷度的方法。
The liquid superheat limit and vapor subcooling limit in homogeneous nucleation are determined in the present paper by using density fluctuation theory of statistical thermodynamics.
对巨正则系综蒙特卡罗法,目前在活性炭吸附特征研究中所普遍采用的活性炭微孔模型和分子与原子之间相互作用的模型进行较为详细的介绍。
This paper introduces the GCEMC method, pore models commonly used in the simulations of adsorption on activated carbons and the fluid-fluid and the fluid - wall potential model.
对巨正则系综蒙特卡罗法,目前在活性炭吸附特征研究中所普遍采用的活性炭微孔模型和分子与原子之间相互作用的模型进行较为详细的介绍。
This paper introduces the GCEMC method, pore models commonly used in the simulations of adsorption on activated carbons and the fluid-fluid and the fluid - wall potential model.
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