Browse > Article

Using Central Manifold Theorem in the Analysis of Master-Slave Synchronization Networks  

Castilho, Jose-Roberto (University of Sao Paulo)
Carlos Nehemy (University of Sao Paulo)
Alves, Luiz-Henrique (University of Sao Paulo)
Publication Information
Journal of Communications and Networks / v.6, no.3, 2004 , pp. 197-202 More about this Journal
Abstract
This work presents a stability analysis of the synchronous state for one-way master-slave time distribution networks with single star topology. Using bifurcation theory, the dynamical behavior of second-order phase-locked loops employed to extract the synchronous state in each node is analyzed in function of the constitutive parameters. Two usual inputs, the step and the ramp phase perturbations, are supposed to appear in the master node and, in each case, the existence and the stability of the synchronous state are studied. For parameter combinations resulting in non-hyperbolic synchronous states the linear approximation does not provide any information, even about the local behavior of the system. In this case, the center manifold theorem permits the construction of an equivalent vector field representing the asymptotic behavior of the original system in a local neighborhood of these points. Thus, the local stability can be determined.
Keywords
Bifurcation; master-slave; network; phase-locked loops; single-star; synchronization; synchronous state;
Citations & Related Records

Times Cited By Web Of Science : 5  (Related Records In Web of Science)
Times Cited By SCOPUS : 8
연도 인용수 순위
1 W. C. Lee et al., 'The distributed controller architecture for a masterarm and its application to teleoperation with force feedback,' in Proc. IEEE International Conference on Robotics & Automation, Detroit, MichiganEUA, 1999,pp.213-218
2 L. H. A Monteiro, Sistemas Dinamicos, Sao Paulo-Brazil, Editora Livraria da Fisica, 2002
3 J. R. C. Piqueira and L. H. A. Monteiro, 'Considering secondharmonic terms in the operation of the phase detector for second order phaselocked loop,' IEEE Trans. Circuits Syst. I, vol. 50, no. 6, pp. 805-809, 2003   DOI
4 T. Endo and L. A. Chua, 'Chaos from phase-locked loops, part II: High dissipation case,' IEEE Trans. Circuits Syst., vol. 36, pp. 225-263,1989
5 L. H. A. Monteiro, R. V. dos Santos, and J. R. C. Piqueira, 'Estimating the critical number of slave nodes in a single chain PLL network,' IEEE Comun. Lett., vol. 7, no. 9, pp. 449-450, 2003   DOI   ScienceOn
6 T. Endo and L. A. Chua, 'Bifurcation diagrams and fractal basin boundaries of phase locked loop circuits,' IEEE Trans. Circuits Syst., vol. 37, pp. 534-540, 1990   DOI   ScienceOn
7 T. Endo and L. A. Chua, 'Chaos from phase-locked loops,' IEEE Trans. Circuits Syst., vol. 35, pp. 987-1003, 1988   DOI   ScienceOn
8 J. Guckenheimer and P. J. Holmes, Nonlinear Oscillations, Dynamical Systems, and Bifucation of Vector Fields, New York-EUA, SpringerVerlag, 1983
9 W. C. Lindsey et al., 'Network syncronization,' Proc. IEEE, vol. 73, no 10,pp. 1445-1467, 1972
10 G. Shao, F. Berman, and R. Wolski, 'Master/slave computing on the grid,'in Proc. IEEE 21st COMPSAC, 2000
11 F. M. A. Salam, J. E. Marsden, and P. P. Varaya, 'Chaos and Arnold diffusion in dynamical systems,' IEEE Trans. Circuits Syst., vol. 30, pp. 697-708, 1983   DOI
12 S. Wiggins, Introduction to Applied Nonlinear Dynamical Systems and Chaos, New York-EUA, Springer-Verlag, 1990
13 K. Ogata, Modern Control Engineering, New Jersey, Prentice-Hall, 1997
14 L. H. A. Monteiro, D. N. Favaretto Filho, and J. R. C. Piqueira, 'Bifurcation analysis for third order phase locked loops,' IEEE Signal Processing Lett., vol. 11, no. 5, pp. 494-496, 2004   DOI   ScienceOn
15 S. Sohail and G. Raj, 'Replication of multimedia data using master slave architecture,' in Proc. IEEE 21st COMPSAC, 1997
16 J. Carr, Applications of Centre Manifold Theory, New York-EUA, Springer-Verlag, 1981