Article | Open

Microstructural characterization of random packings of cubic particles

  • Scientific Reports 6, Article number: 35024 (2016)
  • doi:10.1038/srep35024
  • Download Citation
Received:
Accepted:
Published online:

Abstract

Understanding the properties of random packings of solid objects is of critical importance to a wide variety of fundamental scientific and practical problems. The great majority of the previous works focused, however, on packings of spherical and sphere-like particles. We report the first detailed simulation and characterization of packings of non-overlapping cubic particles. Such packings arise in a variety of problems, ranging from biological materials, to colloids and fabrication of porous scaffolds using salt powders. In addition, packing of cubic salt crystals arise in various problems involving preservation of pavements, paintings, and historical monuments, mineral-fluid interactions, CO2 sequestration in rock, and intrusion of groundwater aquifers by saline water. Not much is known, however, about the structure and statistical descriptors of such packings. We have developed a version of the random sequential addition algorithm to generate such packings, and have computed a variety of microstructural descriptors, including the radial distribution function, two-point probability function, orientational correlation function, specific surface, and mean chord length, and have studied the effect of finite system size and porosity on such characteristics. The results indicate the existence of both spatial and orientational long-range order in the packing, which is more distinctive for higher packing densities. The maximum packing fraction is about 0.57.

Introduction

Properties of packings of non-overlapping particles have been of fundamental and practical interests for decades, and have been studied intensively. At the fundamental level such packings have been used as conceptual models to study and understand the structure of liquids, glassy and crystal states of matter1,2,3, granular media4, and heterogeneous materials3,5,6. From a practical view point, packings of particles are relevant to powders7, cell membranes8, thin films9, colloidal dispersion10, and composite materials3,5,6.

The great majority of the previous studies of packings of non-overlapping particles were devoted to those in which the particles were spherical, with relatively limited studies of elliptical particles11,12,13,14,15. More recently, attention has been focused on packings of particles with more complex shapes, including disks16,17, hard rectangles18, Platonic and Archimedean solids19,20, tetrahedral21,22,23, and other types24. Many of the issues relevant to packings of solid objects have been reviewed by Torquato and Stillinger25.

In this paper we report on the results of extensive computer simulation of microstructural characterization of an important, yet unexplored type of packings, namely, those that consist of non-overlapping cubic particles. Such packings are encountered in biological materials, colloids26 and other types of systems of scientific importance. An important practical example is evaporation of saline water. As evaporation proceeds, salt crystallizes and precipitates on the surface of the system in which the water is flowing, giving rise to a packing of cubic salt crystals that damages the surface. Understanding this phenomenon and how the packing changes the morphology of the system in which salt has precipitated are of fundamental importance to preservation of pavements, paintings, and historical monuments, mineral-fluid interactions, CO2 sequestration in rock, and intrusion of groundwater aquifers by saline water, as the world faces increasing difficulty in obtaining the drinking water that it needs27. New methods for fabrication of scaffolds involve salt leaching in salt powder and the structure of the scaffolds depends critically on the microstructure of the salt powder28,29.

The first step toward understanding the properties of random packings of cubic particles is generating a model for them. Development of an efficient algorithm for disordered packings of cubes, particularly disordered jammed packings, has been traditionally considered as a hard problem. We have developed a version of the random sequential addition (RSA) algorithm to generate such packings. The reason for using the RSA algorithm is that other algorithms, such as various molecular dynamics and Monte Carlo methods for hard-particle packings are not applicable to cubic particles, because the overlap potential functions cannot be constructed for particles with non-smooth shapes, including all the Platonic and Archimedean solids.

Results

We assume that all the particles have the same size with length of their edge being d0. We refer to the pore space and solid particles as phases 1 and 2, respectively. The structure of any random packing of non-overlapping particles depends on the packing density ϕ2 and the porosity ϕ1. Figure 1 presents two random packings with the same particle density ϕ2 = 0.3, but with different particle sizes of d0 = 0.05L and d0 = 0.1L, with the size of the simulation cell being L × L × L. For a fixed packing density ϕ2, smaller particles lead to better structured configurations. This is due to the finite system size that are particularly important for large particles.

Figure 1
Figure 1

Packings of non-overlapping equal-size cubic particles with (a) N = 2600 and d0 = 0.05L (b) N = 400 and d0 = 0.1L, with N being the number of particles.

In order to analyze the statistical properties of the random packings, we have computed several of their most important microstructural descriptors, including the radial distribution function g(r), the two-point probability function S2(r), the face-normal correlation function CFN(r), the specific surface s, and the mean chord length lC. For each case we have studied the effect of two important factors, namely, the size of the particles and the porosity of the packings.

Microstructural Descriptors

The radial distribution function g(r) is the probability of finding a particle at a distance of r away from a given reference particle, and describes how density of a system varies as a function of r. Figure 2 presents g(r) for three packings with three particle sizes. The packing density ϕ2 = 0.45 is fixed for all the three packings. For all the cube sizes, g(r) has its first peak at distance r ≈ 2.8rin = 1.4d0, where rin = d0/2 is the cube insphere radius, in agreement with theoretical expectation. Furthermore, the fluctuation of g(r) beyond the first peak indicates an order-on-average of the disordered packing. This behavior is similar to the predictions of the analytic solutions of the Percus-Yevick equation of fluids and experimental data for hard spheres2,30. The oscillations also indicate long-range order in the packing. The evidence for order is that, in its absence g(r) decays to unity very rapidly. In other words, the deviations of g(r) from unity signify the degree of spatial correlation between the particles, with unity corresponding to no spatial correlation. Note that, the smaller the particles’ size, the larger are the oscillations in g(r), demonstrating that the crystallinity of the packing is improved for larger number of the particles of smaller sizes. Thus, such an effect represents finite-size effect for larger particles.

Figure 2: Dependence on the particle size of the radial distribution function g(r) of the packings with the packing density ϕ2 = 0.45.
Figure 2

rin is the radius of the cube insphere.

The two-point probability function is the probability that two points separated by a distance r are both in the pore space (a similar function can be defined for the solid phase). The computed for the same three packings of Fig. 2 are presented in Fig. 3. The porosity of the packings is, . Furthermore, approaches 0.31 for large r since, theoretically, . As illustrated in Fig. 3, although the initial and final values (ϕ1 and , respectively) are the same, the slope of the two-point probability function, as well as its rate of approach to are different for various particle sizes. Furthermore, the minima of the curves occur at distances equal to the corresponding particle sizes, implying that the probability of finding two end points of a line segment r follows the same behavior, but the rate of approach depends on the particles’ size. This feature affects the distance between particles’ surfaces, as well as the ratio surface/volume of the packing.

Figure 3: Dependence on the particle size of the two-point probability function for the pore phase of the packings with the packing density ϕ2  = 0.45.
Figure 3

The size of the simulation cell is L × L × L.

We also computed the face-normal correlation function CFN(r), representing an orientational correlation between different particles’ faces. Figure 4 presents the results. When the orientational long-range order is present in the system, the particles have many face-to-face contacts and the largest angle between two normal vectors to the faces of the cubes will be π. Hence, CFN(r) must be close to unity even at far distances. Figure 4 indicates that CFN(r) is indeed in the interval (0.9, 1), and close to unity for all radial distances. Figure 4 also indicates that the size of the particles does not strongly affect this important feature of CFN, and that the RSA packings of cubic particles possess orientational long-range order.

Figure 4: Dependence on the particle size of the face-normal correlation function CFN(r) of the packings with the packing density ϕ2 = 0.45, where rin is the radius of the cubes’ insphere.
Figure 4

Two key characteristics of packings that are useful for estimating their flow and transport properties are the specific surface s and mean cord length lC. More generally, one may also define a cord length distribution function. Table 1 presents the two quantities for the three packings of Fig. 2. Since the two parameters are directly calculated from the slope of the two-point probability function , we find that the slope of the function and its approach to are dependent on the size of the particles and, therefore, for a fixed density, packings of smaller particles have larger specific surfaces (the interfacial area per unit volume), which is the basis for fabrication of porous materials with large internal surface. The pore space of the same packings also have smaller chord lengths. We find that the relations between the two characteristics, the particles’ size and the dimension of the system, are approximately, s(d0) ≈ −516.74d0/L + 71.66 and lC(d0) ≈ 1.16d0/L − 0.01. Such correlations are useful for the calculation of the various flow and transport properties of porous media31,32.

Table 1: Dependence on the particles’ size of the specific surface s and mean chord length l C for the pore phase of the packings with packing density ϕ2 = 0.45.

Effect of the Porosity

The radial distribution functions g(r) for the packings with fixed particle size d0 = 0.05L, but various packing densities are presented in Fig. 5. As the figure indicates, both the first peak and the oscillations of g(r) around unity vary with the packing density. Although the first peak of g(r) for all the packing densities occurs at r ≈ 2.8rin = 1.4d0, its magnitude varies from 4.8 for ϕ2 = 0.45 to 3.6 for ϕ2 = 0.35 and 2.4 for ϕ2 = 0.25. This is expected as the number of the nearest neighbors of a cubic particle is larger for higher packing densities.

Figure 5: Dependence of the radial distribution function g(r) on the packing density ϕ2.
Figure 5

rin is the radius of the cubes’ insphere, and the size of the particles is d0 = 0.05L.

In addition, it is well-known that the mean number Z of the nearest-neighbors of a given particle is given by

where r0 is the rightmost position starting from r = 0 at which g(r) = 0, rm is the position of the first minimum after the first peak, and ρ is the number density of particles. The results are Z = 4.31, 3.46 and 2.4 for ϕ2 = 0.45, 0.35, and 0.25, respectively, and agree with our computations.

Moreover, the distance between the first and second peaks of g(r) is smaller for higher packing densities. Besides, the higher the packing density, the more strongly is the fluctuating behavior and, hence, the stronger is the long-range order. In fact, in the absence of long-range order, the cubic particles are mutually far from one another with no spatial correlation between them, leading to the rapid decay of the radial distribution function to unity. Hence, since the oscillations of g(r) around unity is much larger for higher packing densities, we deduce that the denser RSA packings of cubic particles exhibit better spatial long-range order.

The two-point probability function of the pore phase of the same packings are shown in Fig. 6. The porosities are , 0.65 and 0.75 for the aforementioned packing densities, and , 0.43 and 0.57, as the radial distance r increases. Furthermore, as ϕ2 decreases, i.e. as the pore sizes increase, becomes a weaker function of the distance, since the pore space has been enlarged and, therefore, the probability that two points separated by a distance r in the pore space becomes more or less independent of the distance. The slope of with respect to r is greater for higher density, which influences the specific surface and the mean distance between the particles’ surfaces, i.e. the mean chord length.

Figure 6: Dependence of the two-point probability function on the packing density ϕ2
Figure 6

. rin is the radius of the cubes’ insphere, and the particles’ size is d0 = 0.05L.

The corresponding face-normal correlation functions CFN(r) for the same packings are exhibited in Fig. 7. As shown, the higher the packing density, the closer to unity is the orientational correlation function CFN(r). Furthermore, independence of this feature from the radial distance r indicates the existence of orientational long-range order. We therefore conclude that the packing of cubic particles have both spatial and orientational long-range order, particularly at higher packing densities.

Figure 7: Dependence of the face-normal correlation function CFN on the packing density ϕ2.
Figure 7

rin is the radius of the cubes’ insphere, and the particles’ size is d0 = 0.05L.

We also computed the specific surface s and mean cord length lC for the pore space of the same packings. The results are listed in Table 2. The pore space of the packings with higher densities has larger specific surfaces, but smaller chord lengths. In addition to physical ground, this was expected from the slope of with respect to r at r = 0 for various packing densities; Fig. 6. It means that packings of cubic particles with higher densities have greater specific surfaces, but smaller distances between the surfaces of the cubic particles. The computed results can be approximated by s(ϕ2) ≈ 107.87ϕ2 − 2.34 and lC(ϕ2) ≈ −0.36ϕ2 + 0.2.

Table 2: Dependence on the packing density ϕ2 of the specific surface s and mean chord length l C of the pore phase of the packings with the same particle sizes, d0 = 0.05L.

Discussion

Random packings of non-overlapping equal-sized cubic particles possess both spatial and orientational long-range order, particularly at high packing densities. As long as the densest achievable packing is , the packings with a fixed density but smaller particle sizes have larger specific surfaces and smaller chord lengths in the pore space, which is the same for packings with fixed particle sizes but higher densities. Such insights between the characteristic functions and the size of the particles and the packing density may be used for fabrication of porous materials with large internal surface. Indeed, such efforts are currently underway; the results will be reported in the near future.

Although there is currently no detailed simulations of statistical descriptors for packing of cubic particles, our computed maximum packing fraction may be compared with the work of Baker and Kudrolli20 and that of Agarwal and Escobedo33. The maximum packing fractions in these works is 0.45 for the isotropic phase and 0.57 for the cubatic phase (mesophase or liquid-crystal state). Packing fractions greater than 0.57 represent the crystal phase, which cannot be achieved by random close packings. Hence, the maximum packing fraction computed in our work, , bears close resemblance to that of the cubatic phase and, thus, exhibits the mesophase behavior. Furthermore, the statistical descriptors analyzed in this work are mostly related to the packing fractions in the isotropic phase (below ϕ2 = 0.45). As we demonstrated, by increasing the packing fraction to the limits of this phase, ϕ2 → 0.45, the long-range order is better developed, and the packing demonstrates mesophase (liquid-crystal) behavior.

Further comparison of our results with those of the dense packings of other Platonic solids19,20, and in particular tetrahedral particles, indicates that random packings of cubic particles have better-structured configurations. In particular, dense packings of tetrahedral particles19 possess short-range order. Although the radial distribution function for such packings exhibits behavior similar to that of packings of cubic particles but with faster decay to unity, their orientational correlation function indicates face-to-face contacts between only the neighboring particles, implying short-range orientational correlations. This is in contrast with the random packings studied here that exhibit both spatial and orientational long-range order.

Methods

Packings of spherical and sphere-like particles maybe generated by a variety of algorithms, including the random sequential addition (RSA) algorithm12,34,35,36,37,38, particle-growth molecular dynamics method16,39,40,41 and the Monte Carlo schemes17,18,42,43. We have developed an algorithm for generating packings of cubic particles based on the RSA method, which we describe next. Another efficient algorithm was suggested by Munjiza and Latham44.

Algorithm for generating the packings

The RSA is a process for generating disordered packings of d-dimensional particles in . To use the algorithm for generating random packing of cubic particles, we begin with a large, empty region of volume V in , generate cubic particles with randomly-selected positions and orientations, and place them sequentially in the volume. The deposition is subject to the non-overlapping constraint, so that no newly inserted particle can overlap with any existing ones. The addition process can be stopped at any step. The computational details of the algorithm are as follows.

Step 1. Specify the total number of cubic particles, N, and the cubes’ length d0, along with the size of the simulation cell Lx × Ly × Lz.

Step 2. Generate three random numbers xc (0, Lx), yc (0, Ly) and zc (0, Lz) for the center of a new cubic particle.

Step 3. Generate two random numbers u [−1, 1] and ϕ [0, 2π) for the normal vector n of the upper face of the cubes. The normal vector is expressed by

where i, j, k are the three unit vectors in Cartesian coordinates (x, y, z).

Step 4. Determine the matrix R that rotates the unit vector k into the unit vector n through

where I is the identity matrix, and the unit vector v = (v1, v2, v3) is defined as k × n. Furthermore,

It should be noted that if n = k, then R = I, and if n = −k, we have, R = −I.

Step 5. The coordinates of the cube’s eight vertices, Vi for i = [1, 2, ···, 8] are obtained by

where Vc is the coordinate vector of the cube’s center, and Vi,n = RWi, in which W1 = (−d0/2, −d0/2, −d0/2), ···, W8 = (d0/2, d0/2, d0/2).

Step 6. Check if all the cube’s vertices are outside the previously-inserted cubes. If so, the particle is accepted, and nn + 1, where n is the number of generated and accepted cubical particles. If (n ≤ N), go to Step 2 or, else, terminate the simulation.

It is of noteworthy that the non-overlapping constraint (NOC) in step 6 can be replaced by any other constraint. Various NOCs result in diverse packing configurations and microstructural properties. For example, one may define the NOC as the distance between a new cube’s vertices and those of the previously-inserted cubes that must be greater than or equal to . Such a constraint results in smaller packing density when compared to the aforementioned constraint.

Microstructural descriptors

As already mentioned, we compute several microstructural descriptors of the packings that are as follows.

Radial distribution function

The most basic statistical descriptor for isotropic systems is the radial distribution function g(r), where g(r)r2dr is proportional to the conditional probability that a particle’s centroid is found in a spherical shell of thickness dr at a radial distance r from another particle’s centroid at the origin. When there is no long-range order in the system, g(r) decays to unity very rapidly. For crystalline and polycrystalline structures, however, in which remote portions of the same sample exhibit correlated behavior, g(r) exhibits pronounced oscillations around unity.

Two-point probability function

The two-point correlation function for phase i of a multiphase system, defined as

is one of the most important statistical descriptors of random media. It represents the probability of finding two randomly-selected points x1 and x2 in phase i. The indicator function I(i)(x) = 1 if x belongs to phase i and is zero otherwise. For statistically homogeneous and isotropic media, depends only on the distances, i.e.

where r is the distance between x1 and x2. One also has, , in which ϕi is the volume fraction of phase i. In addition, must satisfy, . Finally, for two-phase disordered media one has, . Note that there are certain relations between and other microstructural descriptors3,5, so that knowledge about leads directly to information about such descriptors.

Face-normal correlation function

An important statistical descriptor for packings of nonspherical particles is the face-normal correlation function CFN(r), defined as the average of the largest negative value of the inner product of two face normals of a pair of cubes p and q, separated by a distance r:

Where the overline represents the average. The face-normal correlation function measures the extent to which a cube’s orientation affects the orientation of another cube at a different position.

Specific surface and mean chord length

The specific surface si, defined as the interfacial area per unit volume, represents global information about the internal surface of the ith phase. It can be shown that for d-dimensional isotropic porous media si can be obtained using the first derivative of the two-point probability function through

where, ωd = πd/2/Γ(1 + d/2) is the d-dimensional volume of a sphere of unit radius. The formula is applicable to anisotropic media as well, after angular averaging.

It is straightforward to show that, for statistically isotropic systems of arbitrary microstructure, the mean chord length , defined as the mean probability of finding a chord of length between z and z + dz in phase i, is related to the slope of the probability function at the origin via

Additional Information

How to cite this article: Malmir, H. et al. Microstructural characterization of random packings of cubic particles. Sci. Rep. 6, 35024; doi: 10.1038/srep35024 (2016).

References

  1. 1.

    The Physics of Amorphous Solids (Wiley, New York, 1983).

  2. 2.

    & Principles of Condensed Matter Physics (Cambridge University Press, New York, 2000).

  3. 3.

    Random Heterogeneous Materials: Microstructure and Macroscopic Properties (Springer, New York, 2002).

  4. 4.

    In Granular Matter (ed. ) (Springer-Verlag, New York, 1994).

  5. 5.

    Heterogeneous Materials I: Linear Transport and Optical Properties (Springer, New York, 2003).

  6. 6.

    Heterogeneous Materials II: Nonlinear and Breakdown Properties and Atomistic Modeling (Springer, New York, 2003).

  7. 7.

    Statistical mechanical considerations on the random packing of granular materials. Powder Technol. 25, 163–176 (1980).

  8. 8.

    , & Modeling the simplest form of order in biological membranes. J. Colloid Interface Sci. 81, 280 (1981).

  9. 9.

    & Random packing in two dimensions and the structure of monolayers. J. Colloid Interface Sci. 48, 382 (1974).

  10. 10.

    , & Colloidal Dispersion (Cambridge University Press, Cambridge, 1989).

  11. 11.

    & Conductivity tensor of anisotropic composites from the microstructure. J. Appl. Phys. 67, 1145 (1990).

  12. 12.

    Packing of spheroids in three-dimensional space by random sequential addition. J. Phys. A 30, L839 (1997).

  13. 13.

    , & An advancing front packing of polygons, ellipses, and spheres. In & (eds), Proceedings of the Thirds International Conference on Discrete Element Methods 93–98 (ASCE, Santa Fe, 2002).

  14. 14.

    et al. Improving the density of jammed disordered packings using ellipsoids. Science 303, 990–993 (2004).

  15. 15.

    et al. Experiments on random packings of ellipsoids. Phys. Rev. Lett. 94, 198001 (2005).

  16. 16.

    & Geometric properties of random disk packings. J. Stat. Phys. 60, 561 (1990).

  17. 17.

    , & Concerning maximal packing arrangements of binary disk mixtures. Physica A 342, 428–446 (2004).

  18. 18.

    , , & Tetratic order in the phase behavior of a hard-rectangle system. Phys. Rev. B 73, 054109 (2006).

  19. 19.

    & Dense packings of the platonic and archimedean solids. Nature 460, 876–879 (2009).

  20. 20.

    & Maximum and minimum stable random packings of platonic solids. Phys. Rev. E 82, 061304 (2010).

  21. 21.

    & Packing, tiling, and covering with tetrahedra. Proc. Natl. Acad. Sci. USA 103, 10612 (2006).

  22. 22.

    et al. Disordered, quasicrystalline and crystalline phases of densely packed tetrahedra. Nature 462, 773–777 (2009).

  23. 23.

    , & A random method for simulating loose packs of angular particles using tetrahedrons. Geotechnique 51, 871–879 (2001).

  24. 24.

    , & Evolution of the dense packings of spherotetrahedral particles: from ideal tetrahedra to spheres. Sci. Rep. 5, Article number 15640 (2015).

  25. 25.

    & Jammed hard-particle packings: from Kepler to Bernal and beyond. Rev. Mod. Phys. 82, 2633 (2010).

  26. 26.

    et al. Cubic crystals from cubic colloids. Soft Matter 7, 4139–4142 (2011).

  27. 27.

    , & Pore-scale dynamics of salt precipitation in drying porous media. Phys. Rev. E 88, 032404 (2013).

  28. 28.

    , , & A novel technique for scaffold fabrication: SLUP (salt leaching using powder). Curr. Appl. Phys. 14, 371–377 (2014).

  29. 29.

    & HA/nylon 6,6 porous scaffolds fabricated by salt-leaching/solvent casting technique: effect of nano-sized filler content on scaffold properties. Int. J. Nanomed. 6, 1651–1659 (2011).

  30. 30.

    & Spatial distribution functions of random packed granular spheres obtained by direct particle imaging. Phys. Rev. E 81, 060301 (2010).

  31. 31.

    & Fractal sandstone pores: automated measurements using scanning-electron-microscope images. Phys. Rev. B 33, 6366 (1986).

  32. 32.

    Flow and Transport in Porous Media and Fractured Rock, 2nd ed. (Wiley-VCH, Weinheim, 2011).

  33. 33.

    & Mesophase behaviour of polyhedral particles. Nature Mater. 10, 230–235 (2011).

  34. 34.

    Random sequential addition of hard spheres to a volume. J. Chem. Phys. 44, 3888 (1966).

  35. 35.

    Random sequential adsorption. J. Theor. Biol. 87, 237–254 (1980).

  36. 36.

    Parking problem (sequential packing) simulations in two and three dimensions. J. Colloid Interface Sci. 119, 442–450 (1987).

  37. 37.

    & Random sequential adsorption of oriented superdisks. Phys. Rev. E 79, 042103 (2009).

  38. 38.

    & Precise algorithm to generate random sequential addition of hard hyperspheres at saturation. Phys. Rev. E 88, 053312 (2013).

  39. 39.

    , & Is random close packing of spheres well defined? Phys. Rev. Lett. 84, 2064 (2000).

  40. 40.

    , & Neighbor list collision-driven molecular dynamics for nonspherical hard particles: I. algorithmic details. J. Comput. Phys. 202, 737–764 (2005).

  41. 41.

    , & Neighbor list collision-driven molecular dynamics for nonspherical hard particles: II. applications to ellipses and ellipsoids. J. Comput. Phys. 202, 765–793 (2005).

  42. 42.

    & Computer simulation of close random packing of equal spheres. Phys. Rev. A 32, 2347 (1985).

  43. 43.

    & Hard-sphere statistics along the metastable amorphous branch. Phys. Rev. E 58, 532 (1998).

  44. 44.

    & Comparison of experimental and FEM/DEM results for gravitational deposition of identical cubes. Eng. Comput. 21, 249–264 (2004).

Download references

Acknowledgements

Research at the University of Southern California was supported as part of the Center for Geologic Storage of CO2, an Energy Frontier Research Center funded by the U.S. Department of Energy (DOE), Office of Science, Basic Energy Sciences (BES), under Award DE-SC0C12504 (the work on specific surface area and chord lengths and their dependence on the porosity), and by the Petroleum Research Fund of the American Chemical Society (the work on the various correlation functions). M.S. thanks Yang Jiao for useful discussions at the early stages of this work, and Ali Mehrabi for extensive discussions on novel methods of fabricating new types of porous media that motivated in part the present research.

Author information

Affiliations

  1. Mork Family Department of Chemical Engineering and Materials Science, University of Southern California, Los Angeles, California 90089-1211, USA

    • Hessam Malmir
    •  & Muhammad Sahimi
  2. Department of Physics, Sharif University of Technology, Tehran 11365-9161, Iran

    • M. Reza Rahimi Tabar

Authors

  1. Search for Hessam Malmir in:

  2. Search for Muhammad Sahimi in:

  3. Search for M. Reza Rahimi Tabar in:

Contributions

The problem was conceived by M.S. and M.R.R.T. The computations were carried out by H.M. All authors contributed to analyzing the results. The manuscript was written by H.M. and M.S. with contribution by M.R.R.T.

Competing interests

The authors declare no competing financial interests.

Corresponding author

Correspondence to Muhammad Sahimi.

Comments

By submitting a comment you agree to abide by our Terms and Community Guidelines. If you find something abusive or that does not comply with our terms or guidelines please flag it as inappropriate.

Creative Commons BYThis work is licensed under a Creative Commons Attribution 4.0 International License. The images or other third party material in this article are included in the article’s Creative Commons license, unless indicated otherwise in the credit line; if the material is not included under the Creative Commons license, users will need to obtain permission from the license holder to reproduce the material. To view a copy of this license, visit http://creativecommons.org/licenses/by/4.0/