Minimal realizations of discrete systems

Nonnegative linear time-invariant (LTI) state-space models are characterized by the property that their state variables and outputs remain nonnegative whenever the initial state and the inputs are nonnegative. Necessary and su cient conditions for the existence of a nonnegative state-space realizati

The minimal realization theory for input-output map8 that arise from finitedimensional, continuous time, bilinear systems is discussed. It is shown that an observed bilinear system (i.e. a bilinear system together with an observation functional, but without a Jixed initial state) is completely deter

The problem of closed-loop baIancing discrete LTI models is addressed. It is shown that results similar to those known for the continuous case can be extended to the discrete case. A new cross-Riccati equation is introduced which allows the direct balancing of MIMO symmetric discrete systems avoidin

The positive realization problem for linear systems is to find, for a given transfer function, all possible realizations with a state spaee of minimal dimension such that the resulting system is a positive system. In this paper, discrete-time positive linear systems having the nonnegative orthant re