Howell Daniel W., Behringer R. P., Veje C. T.
Department of Physics and Center for Nonlinear and Complex Systems, Duke University, Durham, North Carolina 27708-0305.
Chaos. 1999 Sep;9(3):559-572. doi: 10.1063/1.166430.
Dense slowly evolving or static granular materials exhibit strong force fluctuations even though the spatial disorder of the grains is relatively weak. Typically, forces are carried preferentially along a network of "force chains." These consist of linearly aligned grains with larger-than-average force. A growing body of work has explored the nature of these fluctuations. We first briefly review recent work concerning stress fluctuations. We then focus on a series of experiments in both two- and three-dimension [(2D) and (3D)] to characterize force fluctuations in slowly sheared systems. Both sets of experiments show strong temporal fluctuations in the local stress/force; the length scales of these fluctuations extend up to 10(2) grains. In 2D, we use photoelastic disks that permit visualization of the internal force structure. From this we can make comparisons to recent models and calculations that predict the distributions of forces. Typically, these models indicate that the distributions should fall off exponentially at large force. We find in the experiments that the force distributions change systematically as we change the mean packing fraction, gamma. For gamma's typical of dense packings of nondeformable grains, we see distributions that are consistent with an exponential decrease at large forces. For both lower and higher gamma, the observed force distributions appear to differ from this prediction, with a more Gaussian distribution at larger gamma and perhaps a power law at lower gamma. For high gamma, the distributions differ from this prediction because the grains begin to deform, allowing more grains to carry the applied force, and causing the distributions to have a local maximum at nonzero force. It is less clear why the distributions differ from the models at lower gamma. An exploration in gamma has led to the discovery of an interesting continuous or "critical" transition (the strengthening/softening transition) in which the mean stress is the order parameter, and the mean packing fraction, gamma, must be adjusted to a value gamma(c) to reach the "critical point." We also follow the motion of individual disks and obtain detailed statistical information on the kinematics, including velocities and particle rotations or spin. Distributions for the azimuthal velocity, V(theta), and spin, S, of the particles are nearly rate invariant, which is consistent with conventional wisdom. Near gamma(c), the grain motion becomes intermittent causing the mean velocity of grains to slow down. Also, the length of stress chains grows as gamma-->gamma(c). The 3D experiments show statistical rate invariance for the stress in the sense that when the power spectra and spectral frequencies of the stress time series are appropriately scaled by the shear rate, Omega, all spectra collapse onto a single curve for given particle and sample sizes. The frequency dependence of the spectra can be characterized by two different power laws, P proportional, variant omega(-alpha), in the high and low frequency regimes: alpha approximately 2 at high omega; alpha<2 at low omega. The force distributions computed from the 3D stress time series are at least qualitatively consistent with exponential fall-off at large stresses. (c) 1999 American Institute of Physics.
致密的缓慢演化或静态颗粒材料即使颗粒的空间无序相对较弱,也会表现出强烈的力波动。通常,力优先沿着“力链”网络传递。这些力链由线性排列且受力大于平均水平的颗粒组成。越来越多的研究工作探索了这些波动的本质。我们首先简要回顾一下近期关于应力波动的工作。然后我们将重点关注一系列二维和三维(2D和3D)实验,以表征缓慢剪切系统中的力波动。这两组实验都表明局部应力/力存在强烈的时间波动;这些波动的长度尺度延伸至10²个颗粒。在二维实验中,我们使用光弹性圆盘,它能使内力结构可视化。由此我们可以与预测力分布的近期模型和计算进行比较。通常,这些模型表明力分布在大力值时应呈指数下降。我们在实验中发现,当我们改变平均堆积分数γ时,力分布会系统地变化。对于不可变形颗粒的致密堆积典型的γ值,我们看到大力值时的分布与指数下降一致。对于较低和较高的γ值,观察到的力分布似乎与该预测不同,γ值较大时分布更接近高斯分布,γ值较低时可能呈幂律分布。对于高γ值,分布与该预测不同是因为颗粒开始变形,使得更多颗粒能够承受施加的力,并导致分布在非零力处有一个局部最大值。γ值较低时分布为何与模型不同则不太清楚。对γ的探索导致发现了一个有趣的连续或“临界”转变(强化/软化转变),其中平均应力是序参量,并且必须将平均堆积分数γ调整到一个值γ(c)才能达到“临界点”。我们还跟踪单个圆盘的运动,并获得关于运动学的详细统计信息,包括速度以及颗粒的旋转或自旋。颗粒的方位角速度V(θ)和自旋S的分布几乎与速率无关,这与传统观点一致。在γ(c)附近,颗粒运动变得间歇性,导致颗粒的平均速度减慢。此外,应力链的长度随着γ趋近γ(c)而增长。三维实验表明应力在统计上与速率无关,即当应力时间序列的功率谱和谱频率通过剪切速率Ω进行适当缩放时,对于给定的颗粒和样本尺寸,所有谱都坍缩到一条单一曲线上。谱的频率依赖性可以用高低频区域的两个不同幂律来表征:P∝ω-α,高频区域α≈2;低频区域α<2。从三维应力时间序列计算出的力分布在大应力时至少在定性上与指数下降一致。(c)1999美国物理研究所。
