Asymptotic behaviour of solutions of two-dimensional neutral differential systems
We study asymptotic properties of solutions of the system of differential equations of neutral type.
We study asymptotic properties of solutions of the system of differential equations of neutral type.
We prove uniqueness of the invariant measure and the exponential convergence to equilibrium for a stochastic dissipative system whose drift is perturbed by a bounded function.
We prove uniqueness of the invariant measure and the exponential convergence to equilibrium for a stochastic dissipative system whose drift is perturbed by a bounded function.
This paper is concerned with the problem of asymptotic equivalence for positive rapidly decaying solutions of a class of second order quasilinear ordinary differential equations. Its application to exterior Dirichlet problems is also given.