Almost periodic skew-symmetric differential systems

“…Nevertheless, for general considered coefficients $$R_n, S_n$$ satisfying $$$$\begin{equation*} \lim \limits _{t \rightarrow \infty } \frac{1}{F(t)} \int \limits _{t}^{t+ F(t)} R_n (\tau ) \, \operatorname{d}\!\tau = \overline{R_n}, \qquad \lim \limits _{t \rightarrow \infty } \frac{1}{F(t)} \int \limits _{t}^{t+ F(t)} S_n (\tau ) \, \operatorname{d}\!\tau = \overline{S_n} \end{equation*}$$$$in the case (6.20), it is not possible to decide whether Equation (4.2) is oscillatory or nonoscillatory. For n perturbations, it follows from constructions introduced in [60] (and applied, e.g., in [30, 31] in the discrete case).…”

Oscillation and nonoscillation of perturbed nonlinear equations with p‐Laplacian

“…Nevertheless, for general considered coefficients $$R_n, S_n$$ satisfying $$$$\begin{equation*} \lim \limits _{t \rightarrow \infty } \frac{1}{F(t)} \int \limits _{t}^{t+ F(t)} R_n (\tau ) \, \operatorname{d}\!\tau = \overline{R_n}, \qquad \lim \limits _{t \rightarrow \infty } \frac{1}{F(t)} \int \limits _{t}^{t+ F(t)} S_n (\tau ) \, \operatorname{d}\!\tau = \overline{S_n} \end{equation*}$$$$in the case (6.20), it is not possible to decide whether Equation (4.2) is oscillatory or nonoscillatory. For n perturbations, it follows from constructions introduced in [60] (and applied, e.g., in [30, 31] in the discrete case).…”

Oscillation and nonoscillation of perturbed nonlinear equations with p‐Laplacian

Limit periodic homogeneous linear difference systems

Solution spaces of homogeneous linear difference systems with coefficient matrices from commutative groups