MULTISTABILITY IN AN ENSEMBLE OF PHASE OSCILLATORS WITH LONG-DISTANCE COUPLINGS

Cite this article as:

Shabunin А. V. MULTISTABILITY IN AN ENSEMBLE OF PHASE OSCILLATORS WITH LONG-DISTANCE COUPLINGS. Izvestiya VUZ. Applied Nonlinear Dynamics, 2016, vol. 24, iss. 3, pp. 38-53. DOI: https://doi.org/10.18500/0869-6632-2016-24-3-38-53

The work is devoted to investigation of multistability of running waves in a ring of periodic oscillators with diffusive non-local couplings. It analyzes the influence of long-range couplings and their change with distance on the stability of spatially-periodic regimes with different wave numbers.

The research are carried out by numerical (computer) experiments. The system under study is an ensemble of identical phase oscillators. It is, on the one hand the most simple model providing opportunities for analytical studies; on the other hand its properties can be generalized to an arbitrary ensemble of almost harmonic self sustained oscillators.

The studies have shown that multistability is observed in the ensemble of phase oscillators as a set of coexisting modes of waves running along the ring, the every of which characterizing by its own phase-shift between oscillations in the neighboring sites. In the case of stationary or slowly varying couplings a running wave mode remains stable while the total phase shift on the interval of interaction keeps to be less than π/2. When the couplings are decreased sufficiently fast, the stabilization of the maximum value of the phase shift is observed, so the further increase of range of interaction no longer affects the number of coexisting modes. Thus, the multistability keeps to exist in an ensemble with an arbitrarily distance of interconnection. The study the basins of attraction of the running waves have demonstrated that basins of long-wavelength modes are increased and simultaneously basins of short-wavelength modes are decreased while the range of interconnection grows.

 

DOI:10.18500/0869-6632-2016-24-3-38-53

 

Paper reference: Shabunin A.V. Multistability in an ensemble of phase oscillators with long-distance couplings. Izvestiya VUZ. Applied Nonlinear Dynamics. 2016. Vol. 24, Issue 3. P. 38–53.

 

Download full version

Authors: 
Shabunin А. V., Saratov State University, ul. Astrakhanskaya, 83, Saratov, 410012, Russia , shabuninav@info.sgu.ru
Key words: 
synchronization, multistability, running waves, phase oscillators.
DOI: 
10.18500/0869-6632-2016-24-3-38-53
Literature

1. Blekhman I.I., Landa P.S., Rosenblum M.G. // Appl. Mech. Rev. 1995. Vol. 11, part 1. P. 733–752.

2. Anishchenko V.S., Vadivasova T.E. // Journal of Communications Technology and Electronics, 2002. Vol. 47, No 2. P. 117–148.

3. Pikovsky A., Rosenblum M., Kurths J. Synchronization: A Universal Concept in Nonlinear Sciences. Cambridge University Press, 2003.

4. Malafeev V.M., Polyakova M.S., Romanovsky Yu.M. // Izv. Vyssh. Uchebn. Zaved., Radiofizika. 1970. Vol. 13. P. 936 (in Russian).

5. Mynbaev D.K., Shilenkov M.I. // Radiotekhnika i elektronika. 1981. No 2. P. 361 (in Russian).

6. Maltzev A.A., Silaev A.M. // Izv. Vyssh. Uchebn. Zaved., Radiofizika. 1979. Vol. 22. P. 826 (in Russian).

7. Dvornikov A.A., Utkin G.M., Chukov A.M. // Izv. Vyssh. Uchebn. Zaved., Radiofizika, 1984. Vol. 27. P. 1388 (in Russian).

8. Ermentrout G.B. // J. of Math. Biol. 1985. Vol. 23. P. 55.

9. Shabunin A.V., Akopov A.A., Astakhov V.V., Vadivasova T.E. // Izvestiya VUZ. Applied Nonlinear Dynamics. 2005. Vol. 13, No 4. P. 37–54 (in Russian).

10. Matias M.A., Guemez J., Perez-Munuzuri V., Marino I.P., Lorenzo M.N., Perez-Villar V. // Phys. Rev. Lett. 1997. Vol. 78, N 2. P. 219-222.

11. Marino I.P., Perez-Munuzuri V., Perez-Villar V., Sanchez E., Matias M.A. // Physica D. 2000. Vol. 128. 224–235.

12. Shabunin A., Astakhov V., Anishchenko V. // Int. J. of Bifurcation and Chaos. 2002. Vol. 12, N 8. P. 1895–1908.

13. Nekorkin V.I., Makarov V.A., Velarde M.G. // Int. J. Bifurcation and Chaos. 1996. Vol. 6. P. 1845.

14. Kuramoto Y. Chemical Oscillations Waves and Turbulence. Berlin: Springer, 1984.

15. Ermentrout G.B., Kopell N. // Comm. Pure Appl. Math. 1986. Vol. 49. P. 623–660.

16. Ermentrout G.B., Kopell N. // SIAM J. of Appl. Math. 1990. Vol. 50. P. 1014–1052.

17. Ermentrout G.B. // J. of Math. Biol. 1985. Vol. 22. P. 1–9.

18. Crawford J.D., Davies K.T.R. // Physica D. 1990. Vol. 125. P. 1–46.

19. Ren L., Ermentrout G.B. // Physica D. 2000. Vol. 143. P. 56.

20. Astakhov V., Shabunin A., Uhm W., Kim S. // Phys. Rev. E. 2001. Vol. 63. P. 056212.

21. Bezruchko B.P., Prokhorov M.D., Seleznev E.P. // Chaos, Solitons anf Fractals. 2003. Vol. 15. P. 695–711.

22. Gurtovnik A.S., Neimark Yu.I. // Dinamicheskie sistemy: Mezhvuzovskiy sbornik nauchnyh trudov. Nizhegorodskiy Univercitet. 1991. P. 84 (in Russian).

Heading: 
Applied Problems of Nonlinear Oscillation and Wave Theory
Status: 
одобрено к публикации
Short Text (PDF): 
a2016no3p038.pdf

BibTeX

@article{Шабунин -IzvVUZ_AND-24-3-38,
author = {А. V. Shabunin},
title = {MULTISTABILITY IN AN ENSEMBLE OF PHASE OSCILLATORS WITH LONG-DISTANCE COUPLINGS},
year = {2016},
journal = {Izvestiya VUZ. Applied Nonlinear Dynamics},
volume = {24},number = {3},
url = {https://old-andjournal.sgu.ru/en/articles/multistability-in-ensemble-of-phase-oscillators-with-long-distance-couplings},
address = {Саратов},
language = {russian},
doi = {10.18500/0869-6632-2016-24-3-38-53},pages = {38--53},issn = {0869-6632},
keywords = {synchronization,multistability,running waves,phase oscillators.},
abstract = {The work is devoted to investigation of multistability of running waves in a ring of periodic oscillators with diffusive non-local couplings. It analyzes the influence of long-range couplings and their change with distance on the stability of spatially-periodic regimes with different wave numbers. The research are carried out by numerical (computer) experiments. The system under study is an ensemble of identical phase oscillators. It is, on the one hand the most simple model providing opportunities for analytical studies; on the other hand its properties can be generalized to an arbitrary ensemble of almost harmonic self sustained oscillators. The studies have shown that multistability is observed in the ensemble of phase oscillators as a set of coexisting modes of waves running along the ring, the every of which characterizing by its own phase-shift between oscillations in the neighboring sites. In the case of stationary or slowly varying couplings a running wave mode remains stable while the total phase shift on the interval of interaction keeps to be less than π/2. When the couplings are decreased sufficiently fast, the stabilization of the maximum value of the phase shift is observed, so the further increase of range of interaction no longer affects the number of coexisting modes. Thus, the multistability keeps to exist in an ensemble with an arbitrarily distance of interconnection. The study the basins of attraction of the running waves have demonstrated that basins of long-wavelength modes are increased and simultaneously basins of short-wavelength modes are decreased while the range of interconnection grows.   DOI:10.18500/0869-6632-2016-24-3-38-53   Paper reference: Shabunin A.V. Multistability in an ensemble of phase oscillators with long-distance couplings. Izvestiya VUZ. Applied Nonlinear Dynamics. 2016. Vol. 24, Issue 3. P. 38–53.   Download full version }}