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Hyperstability

In stability theory, hyperstability is a property of a system that requires the state vector to remain bounded if the inputs are restricted to belonging to a subset of the set of all possible inputs.

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May 30, 2026
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In stability theory, hyperstability is a property of a system that requires the state vector to remain bounded if the inputs are restricted to belonging to a subset of the set of all possible inputs.1

Definition:2 A system is hyperstable if there are two constants k 1 0 , k 2 0 {\displaystyle k_{1}\geq 0,k_{2}\geq 0} such that any state trajectory of the system satisfies the inequality:

x ( t ) < k 1 x ( 0 ) + k 2 , t 0 {\displaystyle \|x(t)\|<k_{1}\|x(0)\|+k_{2},\,\forall t\geq 0}
References

References

  1. Brian D. O Anderson, "A Simplified Viewpoint of Hyperstability", IEEE Transactions on Automatic Control, June 1968
  2. Zinober, Deterministic control of uncertain systems, 1990
See also

See also