On System Operators with Variation Bounding Properties

The property of linear discrete-time time-invariant system operators mapping inputs with at most $k-1$ sign changes to outputs with at $k-1$ sign changes is investigated. We show that this property is tractable via the notion of $k$-sign consistency in case of the observability/controllability operator, which as such can also be used as a sufficient condition for the Hankel operator. Our results complement the literature in several aspects: an algebraic characterization, independent of rank and dimension, is provided for variation bounding and diminishing matrices and their computational tractability is discussed. Based on these, we conduct our studies of variation bounding system operators beyond existing studies on order-preserving $k$-variation diminishment. Our results are applied to the open problem of bounding the number of sign changes in a system's impulse response.