Title :
Minimal positive realizations of transfer functions with positive real poles
Author :
Benvenuti, Luca ; Farina, Lorenzo ; Anderson, Brian D O ; De Bruyne, Franky
Author_Institution :
PARADES, Rome, Italy
fDate :
9/1/2000 12:00:00 AM
Abstract :
A standard result of linear-system theory states that a SISO rational nth-order transfer function always has an nth-order realization. In some applications, one is interested in having a realization with nonnegative entries (i.e., a positive system) and it is known that a positive system may not be minimal in the usual sense. In this paper, we give an explicit necessary and sufficient condition for a third-order transfer function with distinct real positive poles to have a third-order positive realization. The proof is constructive so that it is straightforward to obtain a minimal positive realization.
Keywords :
linear systems; poles and zeros; transfer functions; SISO rational nth-order transfer function; distinct real positive poles; linear-system theory; minimal positive realizations; nonnegative entries; positive real poles; third-order transfer function; Atmospheric modeling; Biological system modeling; Helium; Hidden Markov models; Linear systems; Predictive models; Sufficient conditions; Thermal pollution; Transfer functions; Water storage;
Journal_Title :
Circuits and Systems I: Fundamental Theory and Applications, IEEE Transactions on
