State-Feedback Stabilization of Well-Posed Linear Systems

This is the first part in a three part study of the suboptimal full information H problem for a well-posed linear system with input space º, state space H, and output space ½. We define a cost function Q(x , u)" R> 1y(s), Jy(s)2 7 ds, where y3¸ (R>; ½) is the output of the system with initial state

We consider a linear system subject to Markovian jumps, with a time-varying, unknown-but-bounded transition probability matrix. We derive LMI conditions ensuring various second-moment stability properties for the system. The approach is then used to generate mode-dependent state-feedback control law

This paper addresses the stabilization problem for single-input Markov jump linear systems via modedependent quantized state feedback. Given a measure of quantization coarseness, a mode-dependent logarithmic quantizer and a mode-dependent linear state feedback law can achieve optimal coarseness for

This paper investigates the feedback stabilization problem for SISO linear uncertain control systems with saturating quantized measurements. In the fixed quantization sensitivity framework, we propose a time varying control law able to effectively account for the presence of saturation, which is oft

The sub-optimal Hankel norm approximation problem is solved for a well-posed linear system with generating operators (A; B; C) and transfer function G satisfying some mild assumptions. In the special case of the sub-optimal Nehari problem, an explicit parameterization of all solutions is obtained in