A popov criterion for uncertain linear multivariable systems

We demonstrate the existence of Lur'e-Postnikov type Lyapunov functions for a reasonably general form of the multivariable Popov criterion. In particular, the multipliers need not be positive semi-definite. We discuss the application to the special cases where the feedback element is either diagonal

Akaraet--The notion of interactor matrix or equivalently the Hermite normal form, is a generalization of relative degree to multivariable systems, and is crucial in problems such as decoupling, inverse dynamics, and adaptive control. In order for a system to be input-output decoupled using static st

In this note we propose a criterion for determining whether or not a multivariable linear system may be made to have a diagonal interactor with the possible use of diagonal precompensation. We present a constructive procedure to achieve a diagonal interactor for multivariable linear systems when pos