Robust stability of a class of hybrid dynamic uncertain systems

This paper addresses the problem of robust stabilization of a class of uncertain systems subject to internal (i.e., in the state) point delays, external (i.e., in the input) point delays and nonlinear disturbances by using sliding mode control. Methods for the design of sliding mode controllers base

A game theoretic approach is introduced to analyse the relationship between the quadratic and robust stability of systems with structured uncertainties. Necessary and sufficient condition for the equivalence of these two types of stability is presented. The distance between quadratic and robust stab

The Nyquist robust stability margin k , is proposed as a new tool for analysing the robustness of uncertain systems. The analysis is done using Nyquist arguments involving eigenvalues instead of singular values, and yields exact necessary and sufficient conditions for robust stability. The concept o

This paper studies local stabilization of a class of analytic nonlinear systems in terms of, which includes ordinary bilinear systems as its subset, zR "f (z)#g(z)u, f (0)"0, g(0)"0, z3R which can be achieved via a feedback control law u"u(z) with u(0)"0. Following the theoretical results a potentia