Bilinear state space realization for polynomial stochastic systems

## Infinite-dimensional discrete-time bilinear models driven by Hilbert-space-valued random sequences can be rigorously defined as the uniform limit of finite-dimensional bilinear models. Existence and uniqueness of solutions for such infinite-dimensional models can be established by assuming only

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

## Abstract A stochastic model for chemical reactions is presented, which represents the population of various species involved in a chemical reaction as the continuous state of a __polynomial__ stochastic hybrid system (pSHS). pSHSs correspond to stochastic hybrid systems with polynomial continuou

The purpose of this note is to compare, in an abstruct setting, two current different approaches to the problem of deducing internal (state-space) descriptions from exte~a~ ~inp~t-output) data. Some examples are presented to illustrate the theory.

## Abstract A polynomial matrix solution to the H~2~ output feedback optimal control problems is obtained for systems represented in state‐equation form. The proof does not invoke the separation principle but is obtained in the __z__‐domain. The cost function includes weighted states, which allows