Asymptotic Behavior of a Nonhomogeneous Linear Recurrence System

We establish asymptotic formulae for the solutions of the first order recurrence system x n+1 =(A+B n ) x n , where A and B n (n=0, 1, ...) are square matrices and n=0 &B n & 2 < . As a consequence, we confirm a recent conjecture about the asymptotic behavior of the solutions of the higher order sca

In this paper, we are concerned with the asymptotic behavior of the eigenvalues arising from a one-dimensional linear thermoelastic system with the Dirichlet᎐ Dirichlet boundary condition. It is shown that the eigenfrequency asymptotically falls on two branches: one branch is along the negative hori

In this paper we study the asymptotic behavior of the stability radius of a singularly perturbed system when the small parameter tends to zero. It is proved that for such systems the stability radius tends to the min(r , r ), where r is the inverse of the H -norm of the reduced slow model and r is t

In this paper we study a general variational stability, introduced mainly for weakly stable difference systems. Moreover, we obtain asymptotic formulae for these systems, which state new results about asymptotic behavior for perturbed systems under general hypotheses.

This paper addresses the problem of stabilization of a class of internally passive non-linear time-invariant dynamic systems. A class of non-linear marginally strictly passive (MSP) systems is defined, which is less restrictive than input-strictly passive systems. It is shown that the interconnectio