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- A new concept of strongly extreme stability of the difference system is introduced. We have obtained a stationary oscillation theorem of the system. 摘要对非自治离散周期系统引进强非常稳定性的概念,建立了该系统的平稳振荡定理。
- By means of time scales, this paper established some oscillation theorems for the second-order nonlinear delay dynamic equation on time scales. 摘要借助时间尺度的有关理论,研究了一类二阶非线性时滞动力方程解的振动性。
- The oscillation for solutions of the class of the second order strongly sublinear differential equation are discussed and three new oscillation theorems are obtained. 讨论了一类二阶强次线性微分方程解的振动性质,获得了三个新的振动性定理,推广和改进了相关文献的结果。
- Some oscillation criteria for a class of nonlinear nonautonomous difference equation with variable delay are obtained.Some linearized oscillation theorems for these equation are established. 获得了具有可变时滞的非线性非自治差分方程的振动准则,建立了这类差分方程的几个线性化振动性定理。
- Oscillation Theorem for a Class of Neutral Functional Differential Equations with Positive and Negative Coefficients 一类具有正负系数的中立型泛函微分方程的振动性
- Note on Some Oscillation Theorems in a Recent Paper 关于几个振动定理的注记
- Oscillation Theorem for Certain Classes of Neutral Functional Differential Equations with Positive and Negative Coefficients 几类具有正负系数的中立型泛函微分方程的振动性
- In this article, the second order nonliear neutral differential equations with continuous distributed deviating arguments is concerned, and the oscillatory theorems are obtained. 摘要研究了一类具连续偏差变元的二阶中立型非线性微分方程,并获得了该方程的若干振动性定理。
- Let us restate the assertions above as a theorem. 我们把上述的断言重新表述为一个定理。
- oscillation theorem 振动定理
- The second proof of Theorem 26 is due to James. 定理26的第二个证明属于詹姆斯。
- Theorem g is called binomial theorem. 定理g称为二项式定理。
- This completes the proof of the convexity theorem. 这就完成了凸定理的证明。
- The sandstone shows a more persistent oscillation. 砂岩表示一个更为持久的扰动。
- Having an indicator that stops without oscillation. 指针不摆的停止时没有震动的指示器的
- This calculation illustrates the theorem. 这个计算说明了这样一个定理。
- OSCILLATION THEOREMS FOR SECOND ORDER SUBLINEAR ORDINARY DIFFERENTIAL EQUATIONS 二阶次线性微分方程的振动性
- We call this principle a rule and not a theorem. 我们称这个法则为原理而不称为定理。
- We have thus arrived at the very important theorem. 这样我们就得了一条很重要的法则。
- The theorem may be explained as follows. 这条原理可以这样来阐述。