TY - GEN
T1 - Synchronization preservation under linear polynomial modifications
AU - Becker-Bessudo, D.
AU - Fernández-Anaya, G.
AU - Flores-Godoy, J. J.
PY - 2009
Y1 - 2009
N2 - Robustness and preservation of stability and synchronization in the presence of structural changes is an important issue in the study of chaotic dynamical systems. In this work we present a methodology to establish conditions for preservation of stability in dynamical system in terms of linear matrix polynomial evaluation. The idea is to construct a group of dynamical transformations under which stability is retained along the stable, unstable and synchronization manifolds using simultaneous Schur decompositions.
AB - Robustness and preservation of stability and synchronization in the presence of structural changes is an important issue in the study of chaotic dynamical systems. In this work we present a methodology to establish conditions for preservation of stability in dynamical system in terms of linear matrix polynomial evaluation. The idea is to construct a group of dynamical transformations under which stability is retained along the stable, unstable and synchronization manifolds using simultaneous Schur decompositions.
UR - http://www.scopus.com/inward/record.url?scp=70449631620&partnerID=8YFLogxK
U2 - 10.1109/ACC.2009.5160015
DO - 10.1109/ACC.2009.5160015
M3 - Contribución a la conferencia
AN - SCOPUS:70449631620
SN - 9781424445240
T3 - Proceedings of the American Control Conference
SP - 1491
EP - 1492
BT - 2009 American Control Conference, ACC 2009
T2 - 2009 American Control Conference, ACC 2009
Y2 - 10 June 2009 through 12 June 2009
ER -