Lyapunov Function Sign Video
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Definition
A Lyapunov function is a scalar function V(y) defined on a region D that is continuous, positive definite, V(y)>0 for all y!=0), and has continuous first-order partial derivatives at every point of D. The derivative of V with respect to the system y' = f(y), written as V^*(y) is defined as the dot product V^*(y) = del V(y)*f(y).
Source: http://mathworld.wolfram.com
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