There are many works on the asymptotic stability of second dimensional nonlinear differential equation. In particular, these results only concern with the system which includes one or two terms, whereas few works conc...There are many works on the asymptotic stability of second dimensional nonlinear differential equation. In particular, these results only concern with the system which includes one or two terms, whereas few works concern with system which includes more than two terms. In this paper, system which includes four nonlinear terms are studies. We obtain the global asymptotic stability of zero solution, and discard the condition which require the Liapunov function trends to infinity, and only require that the positive orbit is bounded.展开更多
Let P(z) and P(z) be polynomials of the same degree. We consider the equations u" = P(z)u and u" = P(z)u (z ∈ C) whose solutions are u(z) and u(z), respectively. Let Zk(U) and zk(u), k = 1, 2,...,...Let P(z) and P(z) be polynomials of the same degree. We consider the equations u" = P(z)u and u" = P(z)u (z ∈ C) whose solutions are u(z) and u(z), respectively. Let Zk(U) and zk(u), k = 1, 2,..., be the zeros of u(z) and u(z), respectively. We derive bounds for the quantity sup j inf k|1/zk(u)-1/zj(u)|展开更多
The paper is devoted to non-homogeneous second-order differential equations with polynomial right parts and polynomial coefficients.We derive estimates for the partial sums and products of the zeros of solutions to th...The paper is devoted to non-homogeneous second-order differential equations with polynomial right parts and polynomial coefficients.We derive estimates for the partial sums and products of the zeros of solutions to the considered equations.These estimates give us bounds for the function counting the zeros of solutions and information about the zero-free domains.展开更多
By using the ordinary dichotomy and theory of stability, we study the nonlinear differential equation and obtain some sufficient conditions which guarantee the existence and stability of almost periodic solution for t...By using the ordinary dichotomy and theory of stability, we study the nonlinear differential equation and obtain some sufficient conditions which guarantee the existence and stability of almost periodic solution for the nonlinear differential equation.展开更多
文摘There are many works on the asymptotic stability of second dimensional nonlinear differential equation. In particular, these results only concern with the system which includes one or two terms, whereas few works concern with system which includes more than two terms. In this paper, system which includes four nonlinear terms are studies. We obtain the global asymptotic stability of zero solution, and discard the condition which require the Liapunov function trends to infinity, and only require that the positive orbit is bounded.
文摘Let P(z) and P(z) be polynomials of the same degree. We consider the equations u" = P(z)u and u" = P(z)u (z ∈ C) whose solutions are u(z) and u(z), respectively. Let Zk(U) and zk(u), k = 1, 2,..., be the zeros of u(z) and u(z), respectively. We derive bounds for the quantity sup j inf k|1/zk(u)-1/zj(u)|
文摘The paper is devoted to non-homogeneous second-order differential equations with polynomial right parts and polynomial coefficients.We derive estimates for the partial sums and products of the zeros of solutions to the considered equations.These estimates give us bounds for the function counting the zeros of solutions and information about the zero-free domains.
文摘By using the ordinary dichotomy and theory of stability, we study the nonlinear differential equation and obtain some sufficient conditions which guarantee the existence and stability of almost periodic solution for the nonlinear differential equation.
