Reference
B. De Schutter, V. Blondel, R. de Vries, and B. De Moor, "On the boolean
minimal realization problem in the max-plus algebra: Addendum," Tech. report
97-68a, ESAT-SISTA, K.U.Leuven, Leuven, Belgium, 5 pp., Dec. 1997.
Abstract
In this addendum we present an upper bound for the minimal system order of a
max-linear time-invariant discrete event system that can be computed very
efficiently, and we give some lemmas that characterize the ultimate behavior of
the sequence of consective powers of a matrix in the max-plus algebra.
Downloads
Original paper
- B. De Schutter, V. Blondel, R. de Vries, and B. De Moor, "On the Boolean minimal realization problem in the max-plus algebra," Systems & Control Letters, vol. 35, no. 2, pp. 69-78, Sept. 1998. (online paper, abstract, bibtex, tech. report (pdf))
BibTeX
@techreport{DeSBlo:97-68a,
author = {De Schutter, Bart and Blondel, Vincent and de Vries, Remco
and De Moor, Bart},
title = {On the Boolean Minimal Realization Problem in the Max-Plus
Algebra: {A}ddendum},
number = {97-68a},
institution = {ESAT-SISTA, K.U.Leuven},
address = {Leuven, Belgium},
month = dec,
year = {1997}
}