L1/1-to-L1/1 analysis of linear positive impulsive systems with application to the L1/1-to-L1/1 interval observation of linear impulsive and switched systems

Abstract

Sufficient conditions characterizing the asymptotic stability and the hybrid L1/1-gain of linear positive impulsive systems under minimum and range dwell-time constraints are obtained. These conditions are stated as infinite-dimensional linear programming problems that can be solved using sum of squares programming, a relaxation that is known to be asymptotically exact in the present case. These conditions are then adapted to formulate constructive and convex sufficient conditions for the existence of L1/1-to-L1/1 interval observers for linear impulsive and switched systems. Suitable observer gains can be extracted from the (suboptimal) solution of the infinite-dimensional optimization problem where the L1/1-gain of the system mapping the disturbances to the weighted observation errors is minimized. Some examples on impulsive and switched systems are given for illustration.