Abstract
This letter studies nonlinear dynamic control design for a class of bilinear systems to asymptotically stabilize a given equilibrium point while fulfilling constraints on the control input and state. We design a controller based on integral actions on the system input and output. As special cases, the proposed controller contains a dynamic controller with an integral action of either input or output only and a static controller. Stability analysis of the closed-loop system is performed based on a Lyapunov function. Level sets of the Lyapunov function are utilized to estimate a set of initial states and inputs such that the corresponding state and input trajectories are within specified compact sets. Finally, the proposed control technique is applied to a heat exchanger under constraints on the temperature of each cell (state) and the mass flow rate (input), and simulations show the effectiveness of the proposed approach.
Original language | English |
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Pages (from-to) | 2791-2796 |
Number of pages | 6 |
Journal | IEEE Control Systems Letters |
Volume | 7 |
DOIs | |
Publication status | Published - 26-Jun-2023 |
Keywords
- Control applications
- energy systems
- Lyapunov methods
- output regulation
- stability of nonlinear systems