LMIs in Control/Click here to continue/Controller synthesis/Quadratic Schur Satbilization: Revision history

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11 December 2021

  • curprev 13:3713:37, 11 December 2021 imported>Margav06 3,585 bytes +3,585 Created page with "<big><big>'''LMI for Quadratic Schur Stabilization'''</big></big> A discrete-time system is said to be stable if all roots of its characteristic equation lie in the open unit disk. This provides a condition for the stability of discrete-time linear systems with polytopic uncertainties and a linear time-invariant system with this property is called a Schur stable system. == '''The System''' == Consider discrete time system :<math> \begin{align} x_{k+1}=Ax_k+Bu_k,\\ \e..."
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