Co-design of aperiodic sampled-data min-jumping rules for linear impulsive, switched impulsive and sampled-data systems
It addresses the co-design problem for a class of hybrid systems, offering a tractable optimization approach with theoretical guarantees, though the results are incremental and domain-specific.
This paper provides co-design conditions for jumping-rules and sampled-data control laws for linear impulsive and switched impulsive systems under aperiodic sampling, using sum-of-squares relaxations that are proven non-conservative for sufficiently high polynomial degrees.
Co-design conditions for the design of a jumping-rule and a sampled-data control law for impulsive and impulsive switched systems subject to aperiodic sampled-data measurements are provided. Semi-infinite discrete-time Lyapunov-Metzler conditions are first obtained. As these conditions are difficult to check and generalize to more complex systems, an equivalent formulation is provided in terms of clock-dependent (infinite-dimensional) matrix inequalities. These conditions are then, in turn, approximated by a finite-dimensional optimization problem using a sum of squares based relaxation. It is proven that the sum of squares relaxation is non conservative provided that the degree of the polynomials is sufficiently large. It is emphasized that acceptable results are obtained for low polynomial degrees in the considered examples.