stabilizöitavuusehdot

Stabilizöitavuusehdot refers to the conditions under which a dynamic system can be considered stable. In control theory and related fields, stability is a crucial property, ensuring that a system's response to disturbances or initial conditions remains bounded or converges to an equilibrium state. There are various types of stability, and consequently, different sets of conditions to assess them.

For linear time-invariant (LTI) systems, a common criterion is that all eigenvalues of the system's state-space

For nonlinear systems, stability analysis is generally more complex. Lyapunov's direct method remains a powerful tool,