Stability of distributed-parameter systems with retarded argument

In this paper we consider an optimal control problem described by a system of nonlinear first order hyperbolic partial differential equations with deviating argument, including integral inequality constraints. The control variables are assumed to be measurable, with the corresponding state variables

A method 1s presented for determmmg fimte stabdlty regons for dlstnbuted parameter systems whose transient behavior IS governed by a smgle parabolic dlfferentlal equation The case of an a&abatlc catalytic reactlon IS &scussed m detad However, the same techmques can be apphed to many other systems m

Liapunov-collocation technique is proposed for the analysis of regions of asymptotic stability (RAS) in distributed parameter systems whose unsteady state behavior is described by a system of parabolic partial differential equations. First, the collocation method is used to reduce the partial differ

Open-loop stability in the sense of bounded outputs for bounded inputs, and closed-loop asymptotic stability are considered for a class of distributed parameter systems. This class consists of systems whose dynamics can be represented by a transfer function which is the ratio of the multiple transfo