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Lyapunov redesign

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In nonlinear control, the technique of Lyapunov redesign refers to the design where a stabilizing state feedback controller can be constructed with knowledge of the Lyapunov function V {\displaystyle V} . Consider the system

x ˙ = f ( t , x ) + G ( t , x ) [ u + δ ( t , x , u ) ] {\displaystyle {\dot {x}}=f(t,x)+G(t,x)}

where x R n {\displaystyle x\in R^{n}} is the state vector and u R p {\displaystyle u\in R^{p}} is the vector of inputs. The functions f {\displaystyle f} , G {\displaystyle G} , and δ {\displaystyle \delta } are defined for ( t , x , u ) [ 0 , inf ) × D × R p {\displaystyle (t,x,u)\in [0,\inf )\times D\times R^{p}} , where D R n {\displaystyle D\subset R^{n}} is a domain that contains the origin. A nominal model for this system can be written as

x ˙ = f ( t , x ) + G ( t , x ) u {\displaystyle {\dot {x}}=f(t,x)+G(t,x)u}

and the control law

u = ϕ ( t , x ) + v {\displaystyle u=\phi (t,x)+v}

stabilizes the system. The design of v {\displaystyle v} is called Lyapunov redesign.

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