Oscillation Theorems for Certain Second-Order Nonlinear Matrix Differential Equations(English)
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摘要: 建立了二阶非线性矩阵微分系统 $ (a(t)\X’(t))’+b(t)\X’(t)+\Q(t)f(\X(t))= 0,t\geqslant t_ 0 0$ 的振动性标准, 这里 $\Q(t),$ $f’(\X(t))$ 是 $n \times n$ 矩阵, $f’(\X(t))$ 正定, $a(t)$ 和 $b(t)$ 实值函数. 引进了一个特殊函数 $\phi(t,s,r)=(t-s)^ \alpha (s-r)^ \beta , \alpha,\ \beta \frac 1 2 $\ 是常数,$ \ r \geqslant t_0,$ 得到了形式为 $\lim \sup\lambda_ 1 [.] $ const 的振动性标准, 改进了一些已知的结果.Abstract: Some new oscillation criteria were established for the second order nonlinear matrix differential system $ (a(t)\X’(t))’+b(t)\X’(t)+\Q(t)f(\X(t))= 0,t\geqslant t_ 0 0,$ where $\Q(t),$ $f’(\X(t))$ are $n \times n$ matrices with $f’(\X(t))$ positive definite, and $a(t),$ $b(t)$ are real-valued functions. The criteria were presented in the form of $\lim \sup\lambda_ 1 const $ by using a particular function $\phi(t,s,r)$ defined as $\phi(t,s,r)=(t-s)^ \alpha (s-r)^ \beta $, where $\alpha,\ \beta \frac 1 2 $ are constants and $r \geqslant t_0.$ Our results improve many known oscillation results.
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Key words:
- oscillationsecond ordermatrix differential equation /
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