Technical stability conditions for some dynamic systems with distributed and concentrated parameters

In this paper, control systems with Jags and v,ith distributed-parameters are considered. First, the relation between the stability equation method and the theorem of Pontryagin for testing stability of the zeros of exponential polynomials is considered, then the distributions of roots of double-val

In this paper we propose deÿnitions for strong stabilizability and strong detectability of inÿnite-dimensional control systems. We show that these deÿnitions are appropriate by showing that they can be used to give necessary and su cient conditions for the strong stability of a system in terms of it

A sufficient condition for stability of a class of distributed-parameter systems is derived by use of Liapunov's direct method. This condition is not only sufficient but necessary for a restricted class of systems in which the accessory boundary value problem is self-adjoint. Two applications are gi

In this work we show that the now standard lumped non-linear enhancement of root-locus design still persists for a non-linear distributed parameter boundary control system governed by a scalar viscous Burgers' equation. Namely, we construct a proportional error boundary feedback control law and show

In this work, we are concerned with the monotonicity and the stability study for quasi-monotone reaction-diffusion systems with delay and subject to Dirichlet boundary conditions. We first establish some invariance and comparison results for abstract retarded functional differential equations with n