剪切速度边界条件下耦合振荡器的非平衡动力学

Hidetsugu Sakaguchi
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摘要

在剪切速度边界条件下,研究了矩形晶格上具有惯性的确定性和随机耦合振荡器。我们的耦合振荡器模型表现出各种非难现象,并与耦合极限周期振荡器、位错理论、地震的块弹簧模型和非平衡分子动力学等广泛的研究领域存在各种关系。我们用数值方法展示了耦合振荡器的几个独特的非平衡特性。我们发现,当耗散率较大时,速度的平均值和方差的空间分布变得不均匀。速度的概率分布有时偏离高斯分布。当剪切速率较小,温度较低但不为零时,动能的时间演化变得断断续续。动能的间歇跳跃导致速度分布出现长尾。
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Nonequilibrium dynamics of coupled oscillators under the shear-velocity boundary condition
Deterministic and stochastic coupled oscillators with inertia are studied on the rectangular lattice under the shear-velocity boundary condition. Our coupled oscillator model exhibits various nontrivial phenomena and there are various relationships with wide research areas such as the coupled limit-cycle oscillators, the dislocation theory, a block-spring model of earthquakes, and the nonequilibrium molecular dynamics. We show numerically several unique nonequilibrium properties of the coupled oscillators. We find that the spatial profiles of the average value and variance of the velocity become non-uniform when the dissipation rate is large. The probability distribution of the velocity sometimes deviates from the Gaussian distribution. The time evolution of kinetic energy becomes intermittent when the shear rate is small and the temperature is small but not zero. The intermittent jumps of the kinetic energy cause a long tail in the velocity distribution.
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