Consider a dynamical system given by a system of autonomous ordinary differential equations. In this paper we provide a sufficient local condition for an unbounded subset of the phase space to belong to the basin of attraction of a limit cycle. This condition also guarantees the existence and uniqueness of such a limit cycle, if that subset is compact. If the subset is unbounded, the positive orbits of all points of this set either are unbounded or tend to a unique limit cycle
In dynamical systems examples are common in which two or more attractors coexist, and in such cases ...
none2Cellular Automata (CA) are discrete dynamical systems and an abstract model of parallel computa...
Two-dimensional dynamic systems are considered in the paper aiming at the sufficient condition obtai...
Abstract. Consider a dynamical system given by a system of autonomous or-dinary dierential equations...
In this paper we consider a general differential equation of the form x=f (x) with f epsilon C-l (R-...
In Leonov and Kuznetsov (2013), the authors shown numerically the existence of a limit cycle surroun...
We consider a general system of ordinary differential equations (x) over dot = f (t, x), where x is ...
Numerical methods to determine the basin of attraction for autonomous equations focus on a bounded s...
International audienceWe provide several new criteria for the non-existence and the existence of lim...
Abstract: Theorems on the existence and uniqueness of limit cycles in the general nonlinear os-cilla...
Over the past two decades the theory of limit cycles, especially for quadratic differential systems,...
This note is concerned with certain two-dimensional differential systems x = X(x,y), y = Y{x,y). (1....
This paper is an extension to the recent results presented by M. Sabatini about the existence and un...
This paper deals with the problem of location and existence of limit cycles for real planar polynomi...
AbstractCellular Automata (CA) are discrete dynamical systems and an abstract model of parallel comp...
In dynamical systems examples are common in which two or more attractors coexist, and in such cases ...
none2Cellular Automata (CA) are discrete dynamical systems and an abstract model of parallel computa...
Two-dimensional dynamic systems are considered in the paper aiming at the sufficient condition obtai...
Abstract. Consider a dynamical system given by a system of autonomous or-dinary dierential equations...
In this paper we consider a general differential equation of the form x=f (x) with f epsilon C-l (R-...
In Leonov and Kuznetsov (2013), the authors shown numerically the existence of a limit cycle surroun...
We consider a general system of ordinary differential equations (x) over dot = f (t, x), where x is ...
Numerical methods to determine the basin of attraction for autonomous equations focus on a bounded s...
International audienceWe provide several new criteria for the non-existence and the existence of lim...
Abstract: Theorems on the existence and uniqueness of limit cycles in the general nonlinear os-cilla...
Over the past two decades the theory of limit cycles, especially for quadratic differential systems,...
This note is concerned with certain two-dimensional differential systems x = X(x,y), y = Y{x,y). (1....
This paper is an extension to the recent results presented by M. Sabatini about the existence and un...
This paper deals with the problem of location and existence of limit cycles for real planar polynomi...
AbstractCellular Automata (CA) are discrete dynamical systems and an abstract model of parallel comp...
In dynamical systems examples are common in which two or more attractors coexist, and in such cases ...
none2Cellular Automata (CA) are discrete dynamical systems and an abstract model of parallel computa...
Two-dimensional dynamic systems are considered in the paper aiming at the sufficient condition obtai...