2020
DOI: 10.1177/0959651820952193
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Optimally designed Lyapunov–Krasovskii terminal costs for robust stable–feasible model predictive control of uncertain time-delay nonlinear dynamical systems

Abstract: This article details a new Model Predictive Control algorithm ensuring robust stability and control feasibility for uncertain nonlinear multi-input multi-output dynamical systems considering uncertain time-delay effects. The proposed control algorithm is based on construction of a Lyapunov–Krasovskii functional as terminal cost. Incorporation of this terminal cost into the Model Predictive Control optimization problem and calculation of the associated admissible set result in robust feasibility and robust stab… Show more

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Cited by 5 publications
(2 citation statements)
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“…Depending on the nature of dynamical expressions, the process of calculating supremum and infimum may be conducted analytically, semi‐analytically or even offline. Such approaches would significantly reduce the required computational burden 32,33 Remark In conventional nonlinear MPC techniques, calculation of admissible terminal cost often requires employing intensive optimization solvers as simultaneously obtaining admissible terminal cost alongside with other decision variables is often analytically impossible 32,34 .…”
Section: Model Predictive Sliding Mode Control For Continuum Mechanicmentioning
confidence: 99%
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“…Depending on the nature of dynamical expressions, the process of calculating supremum and infimum may be conducted analytically, semi‐analytically or even offline. Such approaches would significantly reduce the required computational burden 32,33 Remark In conventional nonlinear MPC techniques, calculation of admissible terminal cost often requires employing intensive optimization solvers as simultaneously obtaining admissible terminal cost alongside with other decision variables is often analytically impossible 32,34 .…”
Section: Model Predictive Sliding Mode Control For Continuum Mechanicmentioning
confidence: 99%
“…Alternatively, suboptimal inputs may be assigned by selecting an input in the admissible bound satisfying stability conditions expressed in Theorem 2. In case the appropriate trade‐off between optimality and intensity of numerical calculations can be maintained, MPC schemes are implementable in real‐time even using inexpensive software 32,33 Remark The robust stability condition Equation ) is a second order algebraic equation as a function of α u .…”
Section: Model Predictive Sliding Mode Control For Continuum Mechanicmentioning
confidence: 99%