Stability and Robustness of Homogeneous Differential Inclusions

For time-delay systems with negative degree it has been shown that if for zero delay the system is globally asymp- totically stable, then for any delay it is converging to some

To overcome this issue, the paper introduces into consideration the local homogeneity based on the bi-limit homogeneity introduced in [1], which is the existence of a

The one-dimensional model (2) we propose and analyze in this paper describes the evolution of the concentration of n+1 different atomic species, with external flux boundary

We do not work in the weighted spaces and obtain solvability conditions without proving the Fredholm property which may not hold.. However, more important difference is that we

To conclude, the main characteristics of the ZDCs (linearity of the response as a function of the number of spectators, uniformity of the response versus the beam impact

Keywords: Nonlinear least squares problem, inverse problems, Levenberg-Marquardt method, global and local convergence, worst-case complexity bound, quadratic and linear convergence..

Based on the following result, we will investigate in Section 3 sufficient conditions for the relaxation property (cf. Definition 3.1) which is the key to apply the Baire

The paper is organized as follows: the first Section is devoted to the basic description of implicit control systems on manifolds of jets of infinite order. In Section 2, we extend