Double integrator

In systems and control theory, the double integrator is a canonical example of a second-order control system.[1] It models the dynamics of a simple mass in one-dimensional space under the effect of a time-varying force input .

State space representation

The normalized state space model of a double integrator takes the form

According to this model, the input is the second derivative of the output , hence the name double integrator.

Transfer function representation

Taking the Laplace transform of the state space input-output equation, we see that the transfer function of the double integrator is given by

References

  1. Venkatesh G. Rao and Dennis S. Bernstein (2001). "Naive control of the double integrator" (PDF). IEEE Control Systems Magazine. Retrieved 2012-03-04.
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