A fractal prediction model of sliding friction forces was derived based on the fractal geometry theory. The validity of the model was verified theoretically.
基于分形几何理论,推导出了滑动摩擦力分形预测模型,并从理论上对该模型的正确性进行了分析。
A fractal capillary model for predicting permeability of a porous medium (eg. grainstone) is presented according to the fractal geometry.
根据分形几何理论,提出了一个预测孔隙介质渗透率的分形毛管模型。
Fractal geometry is received in increasing attention as a model of natural phenomena.
作为一种自然景物的模型,分形几何越来越多地受到了人们的关注。
Numerical model of low velocity non Darcy percolation for fractal reservoir has been set up according to fractal geometry and non Darcy percolation mechanics.
根据分形几何学并结合非达西渗流力学,建立了分形油藏低速非达西渗流的数学模型。
In this paper, the relationship between theory of fractal geometry and theory of quotient space is discussed and a new model which combines the character of granularity and fractal is put forward.
本文讨论分形几何与商空间理论的关系,提出商分形的概念,并讨论分形图的逼近与商空间粒度计算之间的关系。
According to the fractal geometry theory and the non-compressed viscous fluid laminar flow theory, the leakage model of metallic gasket based on fractal parameter was established.
依据分形几何理论,结合不可压缩粘性流体层流流动理论,建立基于分形参数的金属垫片泄漏模型,该模型揭示了泄漏率与密封表面形貌之间的关系。
Methods Referring to the result of the former researcher, the new model was set up using the theory of fractal geometry and verified by means of experimental results.
方法结合前人的研究成果,利用分形几何学理论建立新的团聚模型,并用实验结果加以验证。
Based on the structural characteristics of porous media, we used the typically fractal model to simulate the geometry structure of porous dilectrics.
根据多孔介质的结构特点,我们利用分形理论模拟了多孔介质的几何结构。
Based on the structural characteristics of porous media, we used the typically fractal model to simulate the geometry structure of porous dilectrics.
根据多孔介质的结构特点,我们利用分形理论模拟了多孔介质的几何结构。
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