A differential partial backup is based on a partial backup.
部分差异备份,基于部分备份。
This let you supplement a partial backup with a short series of differential partial backups.
这样,您可以通过为数不多的几个部分差异备份来补充部分备份。
Differential partial backup — This backup only records data that has changed in the filegroups since the preceding partial backup.
差异化部分备份——差异化部分备份仅记录自上一次部分备份以来文件组中发生更改的数据区。
Spherical pellet shape also makes a positive contribution during the drying process which functions due to the differential partial pressure of the water vapor between the pellets and the drying gas.
这种球形颗粒形状在加工过程中也起到积极作用,其功能体现水蒸气在球形颗粒和干气之间具有不均匀压力。
And just to tell you again that is a strange partial differential equation relating these two vector fields.
再说明一下,这是关于这两个向量场,多少有点奇怪的偏微分方程。
It is a partial differential equation satisfied by the electric field e.
这是一个,由电场e确定的偏微分方程。
Basically, to every problem you might want to consider there is a partial differential equation to solve.
总的来讲,所有你想解决的问题,都可以用偏微分方程来做。
Now you see how the total differential accounts for, somehow, all the partial derivatives that come as coefficients of the individual variables in these expressions.
现在可以看到,全微分里面的这些偏导数系数,都可以用一个变量表示出来。
Partial differential equation is widely used in problems of science and engineering.
偏微分方程在科学和工程上有着广泛的应用。
But this partial differential equation can not be directly integral, so usually use Navier method, Rayleigh Ritz method and finite difference method and other methods.
但这一偏微分方程不能直接积分,所以通常用纳维法、瑞利-里兹法、有限差分方法等方法求解。
The domain decomposition is a numerically approximating solution to partial differential equations on parallel computers.
区域分解算法是在并行机上求解偏微分方程数值解的一种方法。
At last, an application of this problem in partial differential equation is also discussed.
最后,给出了上述问题在偏微分方程方面的一个应用。
Similar method may be applied in other types of partial differential equations.
类似的方法还可以用在其它类型的偏微分方程数值解中。
The mixed partial differential terms of time variables and space variables in the pseudo-parabolic equation make the discussion of the difference scheme more difficult.
伪抛物型方程中关于时间与空间变量的混合偏导项给差分格式的讨论带来了一定难度。
A nonlinear partial differential equation model based on nonlocal information was proposed to remove noise and preserve the edges.
针对传统扩散模型中的边界模糊问题,提出一种基于非局部信息的非线性偏微分方程去噪模型。
Following the theory on characteristics of first order quasi-linear partial differential equations, classification of the balance equations for two-phase flow in interior ballistics is discussed.
根据一阶拟线性偏微分方程组的特征理论,讨论内弹道两相流方程组的类型。
Partial differential diffusion equation is used to remove the noise of medical ultrasonic image.
研究了偏微分扩散方程在医学超声图像去噪中的应用。
Parameter identification problems belong to the partial differential equations inverse problems. They are also common in the field of natural science and engineering.
参数识别反问题是偏微分方程反问题的一类,也是在自然科学与工程技术的各领域比较常见的问题。
Aim To study a class of boundary value problem of hyperbolic partial functional differential equations with continuous deviating arguments.
目的研究一类具有连续偏差变元的双曲偏泛函微分方程边值问题解的振动性。
The unsteady partial differential equations for expectation and correlation distributions of the stochastic temperature distribution in a solid are obtained.
给出了在固体中随机温度分布的期望和相关性的一个不稳定的偏微分方程模型。
It is a new method to generate surfaces with partial differential equation (PDE).
用偏微分方程(PDE)构造曲面是一种新兴的曲面造型方法。
In recent years, many partial differential equation problems are also appeared in life science and economics.
近年来,在生命科学、经济学中也出现了大量的偏微分方程问题。
In mathematical analysis, an integral transform useful in solving certain types of partial differential equations.
数学分析中的一种积分变换,可用来解决特定类型的偏微分方程序。
In physics, the physical parameter evolution along with the time is often controlled by the non-linear partial differential equation.
在物理学中,物理参量随时间的演化往往是由非线性的偏微分方程支配的。
It is very difficult to get analytic solution except some very specific cases for the model owing to nonlinear partial differential equation.
由于非饱和流动的数学模型归结为非线性的偏微分方程,除了一些很特殊的情况外,很难得到解析解。
With the ordinary theory of Heat Exchange in physics this essay visualizes the essence of second-order homogenous linear partial differential equations.
本文利用物理学中常见的热传导理论,形象地阐释了二阶齐次线性偏微分方程的本质。
With the ordinary theory of Heat Exchange in physics this essay visualizes the essence of second-order homogenous linear partial differential equations.
本文利用物理学中常见的热传导理论,形象地阐释了二阶齐次线性偏微分方程的本质。
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