Reference:
M. Hajiahmadi,
B. De Schutter, and
H. Hellendoorn,
"Robust H∞ control of a class of switched nonlinear
systems with application to macroscopic urban traffic control,"
Proceedings of the 53rd IEEE Conference on Decision and
Control, Los Angeles, California, pp. 1727-1732, Dec. 2014.
Abstract:
This paper presents stability analysis and robust H_∞ control
for nonlinear switched systems bounded in sectors with arbitrary
boundaries. By proposing new and more general multiple Lyapunov
functions that incorporate nonlinearities in the system, we formulate
the stability conditions under arbitrary switching in the form of
linear matrix inequalities. Moreover, an optimization problem subject
to bilinear matrix inequalities is established in order to determine
the minimum L2-gain along with the optimal matrices for the
Lyapunov functions and for the robust state feedback gains. Finally,
the optimization problem is recast as a bi-level convex optimization
problem using loop transformation and other linear matrix inequalities
techniques. Furthermore, in order to illustrate the performance of the
proposed switching control scheme, results for control of an urban
network partitioned into sub-regions and modeled using a high-level
hybrid model are presented.