Lagrange stability

Lagrange stability is a concept in the

.

For any point in the state space, ${\displaystyle x\in M}$ in a real continuous

dynamical system

${\displaystyle (T,M,\Phi )}$, where ${\displaystyle T}$ is ${\displaystyle \mathbb {R} }$, the motion ${\displaystyle \Phi (t,x)}$ is said to be positively Lagrange stable if the positive semi-orbit ${\displaystyle \gamma _{x}^{+}}$ is ${\displaystyle \gamma _{x}^{-}}$ is

compact

, then the motion is said to be negatively Lagrange stable. The motion through ${\displaystyle x}$ is said to be Lagrange stable if it is both positively and negatively Lagrange stable. If the state space ${\displaystyle M}$ is the Euclidean space ${\displaystyle \mathbb {R} ^{n}}$, then the above definitions are equivalent to ${\displaystyle \gamma _{x}^{+},\gamma _{x}^{-}}$ and ${\displaystyle \gamma _{x}}$ being bounded, respectively.

A dynamical system is said to be positively-/negatively-/Lagrange stable if for each ${\displaystyle x\in M}$, the motion ${\displaystyle \Phi (t,x)}$ is positively-/negatively-/Lagrange stable, respectively.

References

• Elias P. Gyftopoulos, Lagrange Stability and Liapunov's Direct Method. Proc. of Symposium on Reactor Kinetics and Control, 1963. (PDF)
• Bhatia, Nam Parshad; Szegő, Giorgio P. (2002). Stability theory of dynamical systems. Springer.
  ISBN 978-3-540-42748-3
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