Journal of South China University of Technology(Natural Science) >
Statistical Voronoi Model for Monodisperse Disk Packings
Received date: 2022-06-01
Online published: 2022-10-20
Supported by
the National Natural Science Foundation of China(11965007);the Science and Technology Planning Project of Guizhou Province(ZK2022148)
It is of great significance to study the geometric structure and characteristics of random packings for understanding the macroscopic physical properties of disordered systems such as granular matter, foam, colloid, etc. Combining with experiments and computer simulations, researchers have explored the random packings of particles with different shapes and dimensions. In theory, some models based on statistical geometry, mean field approximation or stochastic process were proposed to investigate the volume fraction and average coordination number of random packings. However, due to the complex constraints of packing structure, the difficulty of setting a criterion for the disorder, etc., it is difficult to perform rigorous analysis and calculation even for monodisperse disk packings. For the volume fraction of the random closed packing, different studies provided different results. In this paper,a statistical Voronoi model was proposed for the theoretical research of the geometric properties of the monodisperse disk packings. The Voronoi network was used to describe the configuration of a packing and an area formula of the Voronoi network was deduced for general case. Based on the concepts of excluded circle and Voronoi circle, several theorems were given for determining the Voronoi nearest neighbor relationship between rigid disks. For balanced and stable disk packings, based on the relationships between the features of a Voronoi cell and the contact structure of nearest neighbor disks, this paper derived several formulae such as the volume fraction of a symmetric Voronoi cell varying with the contact number, the area of a Voronoi cell and the geometric coordination number varying with angles of neighbor contact lines. Finally, this paper derived the integral formulae for the average geometric coordination number and the average reduced free volume with respect to the probability distribution of the contact line angle by using the statistical analysis of Voronoi network. Theoretical calculation results show that the volume fraction of a Voronoi cell increases both with the increase of its symmetry and its contact number, the average contact number is 4 and the average volume fraction is π2/12 for the random closed packing. These results can be used to understand the geometric structure and feature of the frictionless disk packing.
Key words: granular matter; disordered packing; volume fraction; Voronoi cell
ZHANG Xinggang, DAI Dan, TANG Yan . Statistical Voronoi Model for Monodisperse Disk Packings[J]. Journal of South China University of Technology(Natural Science), 2023 , 51(2) : 122 -130 . DOI: 10.12141/j.issn.1000-565X.220340
| 1 | 冯端,金国钧 .凝聚态物理学[M].北京:高等教育出版社,2003. |
| 2 | ASTE T, WEAIRE D .The pursuit of perfect packing[M].England:Institute of Physics Publishing,2000. |
| 3 | 宗传明 .离散几何欣赏[M].北京:科学出版社,2009. |
| 4 | TORQUATO S, STILLINGER F H.Jammed hard-particle packings:from kepler to bernal and beyond[J].Reviews of Modern Physics,2010,82(3):2633-2672. |
| 5 | BERNAL J D, MASON J .Co-ordination of randomly packed spheres[J].Nature,1960,188:910-911. |
| 6 | DONEV A, CISSE I, SACHS D,et al .Improving the density of jammed disordered packings using ellipsoids[J].Science,2004,303:990-993. |
| 7 | 许文祥,孙洪广,陈文,等 .软物质系颗粒材料组成、微结构与传输性能之间关联建模综述[J].物理学报,2016,65(17):178101. |
| 7 | XU Wen-xiang, SUN Hong-guang, CHEN Wen,et al .A review of correlative modeling for transport properties,microstructures,and compositions of granular materials in soft matter[J].Acta Physica Sinica,2016,65(17):178101. |
| 8 | CHEN Yin-fei, YUAN Ming, WANG Zhi-chao,et al .Structural characterization and statistical properties of jammed soft ellipsoid packing[J].Soft Matter,2021,17(1):2963-2972. |
| 9 | WILKEN S, GUERRA R E, LEVINE D,et al .Random close packing as a dynamical phase transition[J].Physical Review Letters,2021,127(3):038002. |
| 10 | YUAN Ye, JIAO Yang, WANG Yu-jie,et al .Universality of jammed frictional packing[J].Physical Review Research,2021,3(3):033084. |
| 11 | BAULE A, MORONE F, HERRMANN H J,et al .Edwards statistical mechanics for jammed granular matter[J].Reviews of Modern Physics,2018,90(1):015006:1-58. |
| 12 | GOTOH K, FINNEY J L .Statistical geometrical approach to random packing density of equal spheres[J].Nature,1974,252:202-205. |
| 13 | SONG Chao-ming, WANG Ping, MAKSE H A .A phase diagram for jammed matter[J].Nature,2008,453:629-632. |
| 14 | BAULE A, MARI R, BO Lin,et al .Mean-field theory of random close packings of axisymmetric particles[J].Nature Communications,2013,4(1):1-11. |
| 15 | CLUSEL M, CORWIN E I, SIEMENS A O N,et al .‘Granocentric’model for random packing of jammed emulsions[J].Nature,2009,460(7255):611-615. |
| 16 | CORWIN E I, CLUSEL M, SIEMENS A O N,et al .Model for random packing of polydisperse frictionless spheres[J].Soft Matter,2010,6(13):2949. |
| 17 | TORQUATO S, TRUSKETT T M, DEBENEDETTI P G .Is random close packing of spheres well defined?[J].Physical Review Letters,2000,84(10):2064-2067. |
| 18 | ZHANG Jian-hua, ZHENG Wen, TONG Hua,et al .Revealing the characteristic length of random close packing via critical-like random pinning[J].Soft Matter,2022,18(9):1836-1842. |
| 19 | BLUMENFELD R .Disorder criterion and explicit solution for the disc random packing problem[J].Physical Review Letters,2021,127:118002. |
| 20 | ZACCONE A .Explicit analytical solution for random close packing in d = 2 and d = 3[J].Physical Review Letters,2022,128:028002. |
| 21 | 王蓬,孔平,李然,等 .准二维湿颗粒体系融化过程中的结构与缺陷[J].物理学报,2019,70(11):116401. |
| 21 | WANG Peng, KONG Ping, LI Ran,et al .Structure and defects in melting process of quasi-two-dimensional wet particle system[J].Acta Physica Sinica,2019,70(11):116401. |
| 22 | BERG M D .计算几何-算法与应用[M].北京:清华大学出版社,2005. |
| 23 | 张兴刚,胡林 .高维δ函数在系综理论里的应用[J].贵州大学学报(自然科学版),2014,31(6):20-24. |
| 23 | ZHANG Xing-gang, HU Lin .The application of Dirac function in ensemble theory[J].Journal of Guizhou University(Natural Science),2014,31(6):20-24. |
| 24 | O'HERN C S, LANGER S A, LIU A J,et al .Random packings of frictionless particles[J].Physical Review Letters,2002,88(7):075507. |
| 25 | MAJMUDAR T S, SPERL M, LUDING S,et al .Jamming transition in granular systems[J].Physical Review Letters,2007,98(5):058001. |
| 26 | ZHANG Xing-gang, DAI Dan .Aspects of bulk properties of amorphous jammed disks under isotropic compression[J].The European Physical Journal E,2021,44(11):1-11. |
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