This paper considers an application of a local theory of exponentially asymptotically stability of nonsmooth periodic orbits derived from a planar dynamical system of autonomous ordinary differential equations with discontinuous right-hand side. Such dynamical systems are encountered in economic modelling in the context of economic growth. In this paper, we revisit an example considered in a companion paper ofthis journal and show that the explicit solution of the dynamical system is not required in showing exponentially asymptotically stability. We also provide a formula for the basin of attraction. The cost of the new method is also assessed
We consider nonautonomous N-dimensional generalized Lotka-Volterra competition systems. Under certai...
AbstractThe classical criterion of asymptotic stability of the zero solution of equations x′=f(t,x) ...
We study the kind of stability of the periodic orbits provided by higher order averaging theory. We ...
This paper establishes the conditions for existence, uniqueness, and exponentially asymptotically st...
This paper considers a dynamical system defined by a set of ordinary auto- nomous differential equat...
AbstractWe consider the general nonlinear differential equation x˙=f(x) with x∈R2 and develop a meth...
We consider a singularly perturbed parabolic differential equation in case that the degenerate equat...
AbstractIn this work we obtain sufficient conditions for the exponential stability of equilibrium po...
AbstractIn this paper, predator–prey systems with Beddington–DeAngelis functional response are consi...
summary:In this paper, there are derived sufficient conditions for exponential and asymptotic stabil...
AbstractWe consider the Neumann problem for the heat equation perturbed by a dissipation term au, wh...
summary:We establish the asymptotic stability of solutions of the mixed problem for the nonlinear ev...
We discuss the dynamics of general linear functional differential equations with solutions that exhi...
AbstractWe study the existence of periodic solutions for a second-order non-autonomous dynamical sys...
AbstractA classical result, studied, among others, by Carathéodory [C. Carathéodory, Calculus of Var...
We consider nonautonomous N-dimensional generalized Lotka-Volterra competition systems. Under certai...
AbstractThe classical criterion of asymptotic stability of the zero solution of equations x′=f(t,x) ...
We study the kind of stability of the periodic orbits provided by higher order averaging theory. We ...
This paper establishes the conditions for existence, uniqueness, and exponentially asymptotically st...
This paper considers a dynamical system defined by a set of ordinary auto- nomous differential equat...
AbstractWe consider the general nonlinear differential equation x˙=f(x) with x∈R2 and develop a meth...
We consider a singularly perturbed parabolic differential equation in case that the degenerate equat...
AbstractIn this work we obtain sufficient conditions for the exponential stability of equilibrium po...
AbstractIn this paper, predator–prey systems with Beddington–DeAngelis functional response are consi...
summary:In this paper, there are derived sufficient conditions for exponential and asymptotic stabil...
AbstractWe consider the Neumann problem for the heat equation perturbed by a dissipation term au, wh...
summary:We establish the asymptotic stability of solutions of the mixed problem for the nonlinear ev...
We discuss the dynamics of general linear functional differential equations with solutions that exhi...
AbstractWe study the existence of periodic solutions for a second-order non-autonomous dynamical sys...
AbstractA classical result, studied, among others, by Carathéodory [C. Carathéodory, Calculus of Var...
We consider nonautonomous N-dimensional generalized Lotka-Volterra competition systems. Under certai...
AbstractThe classical criterion of asymptotic stability of the zero solution of equations x′=f(t,x) ...
We study the kind of stability of the periodic orbits provided by higher order averaging theory. We ...