1) Power-law tail
幂率拖尾
2) power law
幂率
1.
A simulation is carried out and some complex phenomena, such as phase transitions and power laws, are discovered.
基于 Transit- Stub分层网络拓扑结构模型 ,提出了一个相对复杂的计算机网络模型 ,并通过对仿真结果的处理 ,揭示并分析了其中存在的诸如相变、幂率等复杂性现象 ,同时定性地研究了网络参数的影响。
2.
Many characteristics of topology are analyzed with the corresponding metrics, including power law.
对包括幂率(power law)在内的多种Internet拓扑特征及其相应度量进行了分析,对现有的拓扑模型、拓扑生成算法以及拓扑生成器进行了全面的综述。
3) power-law
幂率
1.
We find that the number of the friends at different weight follows a power-law with exponent equal 1 for every one.
通过计算发现,对于每个个体,他们的不同权重的朋友的数目服从指数为1的幂率分布,为建立个体友谊圈的含权网络提供了一种可能的模式。
4) power law scheme
幂率格式
1.
The power law scheme was used to calculate convective flux and diffusive flux,the over-relaxed correction approach was employed to calculate cross diffusion flux,and Rhie-Chow s momentum interpolation method along with SIMPLEC procedure was used to derive water level correction equation.
针对非结构网格下的潮流数值计算,采用有限体积法离散基本方程,对流-扩散项离散采用幂率格式,交叉扩散项引入超松弛校正方法,水位校正方程应用Rhie-Chow动量插值思想和SIMPLEC类算法导出。
5) power-law distribution
幂率分布
1.
A common property of many large networks is that the vertex degrees follow a scale-free power-law distribution, The BA model features two generic mechanisms: the networks expanding and the pref.
实际网络中节点分布的一个广泛特征是度的无标度幂率分布,BA模型认为形成这种特征的两个主要因素是网络增长和节点间的偏好连接。
2.
Numerical simulations indicate that this network model yields three power-law distributions of the node degrees,node strengths and connection weights.
许多实证复杂网络的度分布和点权分布表现为低头和胖尾的幂率分布。
6) power law fluid
幂率流体
1.
Taking power law fluid as an example, a method of solving the non-Newtonian lubrication in journal bearing is introduced.
以幂率流体为例,介绍了一种求解径向轴承非Newton润滑的方法。
参考词条
补充资料:拖尾因子
分子式:
CAS号:
性质:亦称拖尾因子(tailing factor),为衡量正常色谱峰与不正常色谱峰的指标,用T表示,其定义为:T=W0.05h/2d1。峰不对称度在0.95~1.05之间为对称峰;小于0.95为前沿峰;大于1.05为拖尾峰。
CAS号:
性质:亦称拖尾因子(tailing factor),为衡量正常色谱峰与不正常色谱峰的指标,用T表示,其定义为:T=W0.05h/2d1。峰不对称度在0.95~1.05之间为对称峰;小于0.95为前沿峰;大于1.05为拖尾峰。
说明:补充资料仅用于学习参考,请勿用于其它任何用途。