Algebraic characterization of fixed modes in decentralized control

In this paper, we use an algebraic characterization of "fixed modes" of a decentralized linear multivariable system to show that the fixed modes are related to the "blocking zeros" of certain subsystems derived from the given decentralized system. A numerical algorithm is then presented which enable

The decentralized structure of a large-scale control system imposes constraints on the feedback strategies that can be used. This may lead to fixed modes and structurally fixed modes. In this paper it is discussed to what extent decentralized time-varying feedback control strategies may eliminate fi

We examine a characterization of fixed modes in a frequency-domain framework based on the graphical representation of systems with multiple poles. We present a graph-theoretic characterization of the characteristic polynomials of closed-loop systems under arbitrary structural constraints. Based on t

A general expression is derived relating an arbitrary output feedback controller to the resulting closed-loop characteristic polynomial in terms of suitably defined zero polynomials of the system. This expression is then used to characterize the fixed modes of a multivariable system with respect to

Spurious states arise naturally in the description of molecular vibrational excitations. In the harmonic approximation such states can be projected out from the physical space exactly. This is in general not the case when anharmonic interactions are considered. We show that within the framework of t