A contraction metric for an autonomous ordinary differential equation is a Riemannian metric such that the distance between adjacent solutions contracts over time. A contraction metric can be used to determine the basin of attraction of an equilibrium and it is robust to small perturbations of the system, including those varying the position of the equilibrium. The contraction metric is described by a matrix-valued function M(x) such that M(x) is positive definite and F(M)(x) is negative definite, where F denotes a certain first-order differential operator. In this paper, we show existence, uniqueness and continuous dependence on the right-hand side of the matrix-valued partial differential equation F(M)(x) = −C(x). We then use a constructi...
In this Note we present a general and fairly simple method to design families of contractions for no...
A Riemannian metric with a local contraction property can be used to prove existence and uniqueness ...
The purpose of this dissertation is to study synchronous behavior of certain nonlinear dynamical sys...
Contraction analysis uses a local criterion to prove the long-term behaviour of a dynamical system. ...
A contraction metric for an autonomous ordinary differential equation is a Riemannian metric such th...
The determination of exponentially stable equilibria and their basin of attraction for a dynamical s...
The stability and the basin of attraction of a periodic orbit can be determined using a contraction ...
We consider a non-autonomous ordinary differential equation over a finite time interval [T1; T2]. Th...
Contraction analysis considers the distance between two adjacent trajectories. If this distance is c...
The stability and basin of attraction of an equilibrium can be determined by a contraction metric. ...
Exponentially stable periodic orbits of ordinary differential equations and their basins' of attract...
Contraction analysis uses a local criterion to prove the long-term behaviour of a dynamical system. ...
In this Note we present a general and fairly simple method to design families of contractions for no...
We study the stability of invariant sets such as equilibria or periodic orbits of a Dynamical System...
In this chapter, we introduce a generalized contractions and prove some fixed point theorems in gene...
In this Note we present a general and fairly simple method to design families of contractions for no...
A Riemannian metric with a local contraction property can be used to prove existence and uniqueness ...
The purpose of this dissertation is to study synchronous behavior of certain nonlinear dynamical sys...
Contraction analysis uses a local criterion to prove the long-term behaviour of a dynamical system. ...
A contraction metric for an autonomous ordinary differential equation is a Riemannian metric such th...
The determination of exponentially stable equilibria and their basin of attraction for a dynamical s...
The stability and the basin of attraction of a periodic orbit can be determined using a contraction ...
We consider a non-autonomous ordinary differential equation over a finite time interval [T1; T2]. Th...
Contraction analysis considers the distance between two adjacent trajectories. If this distance is c...
The stability and basin of attraction of an equilibrium can be determined by a contraction metric. ...
Exponentially stable periodic orbits of ordinary differential equations and their basins' of attract...
Contraction analysis uses a local criterion to prove the long-term behaviour of a dynamical system. ...
In this Note we present a general and fairly simple method to design families of contractions for no...
We study the stability of invariant sets such as equilibria or periodic orbits of a Dynamical System...
In this chapter, we introduce a generalized contractions and prove some fixed point theorems in gene...
In this Note we present a general and fairly simple method to design families of contractions for no...
A Riemannian metric with a local contraction property can be used to prove existence and uniqueness ...
The purpose of this dissertation is to study synchronous behavior of certain nonlinear dynamical sys...