Finite Number Of Linear Matrix Inequalities Research Articles

Performance‐oriented quasi‐LPV modeling of nonlinear systems

SummaryPolytopic quasi–linear parameter‐varying (quasi‐LPV) models of nonlinear processes allow the usage linear matrix inequalities (LMIs) to guarantee some performance goal on them (in most cases, locally, over a so‐called modeling region). In order to get a finite number of LMIs, nonlinearities are embedded on the convex hull of a finite set of linear models. However, for a given system, the quasi‐LPV representations are not unique, yielding different performance bounds depending on the model choice. To avoid such drawback, earlier literature on the topic used annihilator‐based approaches, which require gridding on the modeling region, and nonconvex BMI conditions for controller synthesis; optimal performance bounds are obtained, but with a huge computational burden. This paper proposes building a model by minimizing the projection of the nonlinearities onto directions, which are deleterious for performance. For a small modeling region, these directions are obtained from LMIs with the linearized model. Additionally, these directions will guide the selection of the polytopic embedding's vertices. The procedure allows gridding‐free LMI controller synthesis, as in standard LPV setups, with a very reduced performance loss with respect to the aforementioned BMI+gridding approaches, at a fraction of the computational cost.

Extended state observer-based robust non-linear integral dynamic surface control for triaxial MEMS gyroscope

SUMMARYThis paper reports an extended state observer (ESO)-based robust dynamic surface control (DSC) method for triaxial MEMS gyroscope applications. An ESO with non-linear gain function is designed to estimate both velocity and disturbance vectors of the gyroscope dynamics via measured position signals. Using the sector-bounded property of the non-linear gain function, the design of an $\mathcal{L}_2$-robust ESO is phrased as a convex optimization problem in terms of linear matrix inequalities (LMIs). Next, by using the estimated velocity and disturbance, a certainty equivalence tracking controller is designed based on DSC. To achieve an improved robustness and to remove static steady-state tracking errors, new non-linear integral error surfaces are incorporated into the DSC. Based on the energy-to-peak ($\mathcal{L}_2$-$\mathcal{L}_\infty$) performance criterion, a finite number of LMIs are derived to obtain the DSC gains. In order to prevent amplification of the measurement noise in the DSC error dynamics, a multi-objective convex optimization problem, which guarantees a prescribed $\mathcal{L}_2$-$\mathcal{L}_\infty$ performance bound, is considered. Finally, the efficacy of the proposed control method is illustrated by detailed software simulations.

LPV Controller Design for Robot Manipulators Based on Augmented LMI Conditions with Structural Constraints

This paper addresses the Linear Parameter Varying (LPV) control of robot manipulators. The dynamical model of such mechanical systems, obtained by writing the Euler-Lagrange equations, is nonlinear. Based on the measured signals and some change of variables, the nonlinear model can lead to an equivalent LPV state-space representation of the system. In this paper, we present a design method of state-feedback and output-feedback LPV controllers for robot manipulators. This method uses structured parameter-dependent Lyapunov matrices and proposes augmented Linear Matrix Inequalities (LMI) conditions with structural constraints. These design conditions are given as a finite number of LMIs. The validity of the proposed approach is demonstrated through simulations.