布朗运动中非相互作用粒子的凝聚理论

George M Hidy
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引用次数: 129

摘要

评述了布朗运动中粒子凝聚的理论。利用混凝方程的数值解,研究了颗粒大小的不均一性和颗粒在稀薄介质中的运动的影响。介质的非均匀性和介质平均自由程与颗粒半径之比(颗粒的克努森数)的增加增加了凝固速率。数值实验结果表明,在无量纲混凝次数约为3次后,粒径分布形成自保函数。在足够长的时间后,发现自保谱与初始分布无关。渐近分布的形状随介质平均自由程与粒子半径之比(λ/r1)的变化而变化。一个累积分布迅速形成,它对时间、初始条件和λ/r1的变化不敏感。平均累积分布与实验确定的分布相当吻合。
本文章由计算机程序翻译,如有差异,请以英文原文为准。
On the theory of the coagulation of noninteracting particles in brownian motion

The theory for coagulation of particles in Brownian motion is reviewed. The effects of heterogeneity in particle size, and of particle motion in a rarefied medium are examined using numerical solutions of the coagulation equations. Heterogeneity and increased values of the ratio of the mean free path of the medium to the particle radius (the Knudsen number for particles) increased the rate of coagulation. According to the results of the numerical experiments, a self-preserving function for the size distribution develops after dimensionless coagulation times of about 3. The self-preserving spectrum was found to be independent of the initial distribution after a sufficiently long time. The shape of the asymptotic distribution varied with the ratio of the mean free path of the medium to the particle radius (λ/r1). A cumulative distribution rapidly formed which was insensitive to time, to initial conditions, and to variations in λ/r1 up to one. The average cumulative distribution compared fairly well with an experimentally determined distribution.

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