A new model-based optimizing controller for a set of nonlinear systems
is proposed. The nonlinear model set is based on a convex combination
of two bounding linear models. An optimal control sequence is compute
d for each of the two bounding models. The proposed control algorithm
is based on a convex combination of the two control sequences. A novel
feature in these two optimizations is an added constraint related to
the feasibility of the 'other' bounding model. The control algorithm c
an for example be used in model predictive control. We provide robust
feasibility guarantees and an upper bound on the optimal criterion if
the bounding models are linear FIR models. Further, simulation example
s demonstrate significant feasibility improvements in the case where t
he bounding models are general linear state-space models. The proposed
method guarantees robust feasibility for a 1-step ahead prediction in
the general case. This can be of interest in MPC applications. (C) 19
97 Elsevier Science Ltd. All rights reserved.