アドホックネットワーク,ユビキタス・ネットワーク

同期現象(シンクロニゼーション)の解明,同期システムへの応用

ネットワークダイナミクス, 粘菌の分散知能の研究

注入同期の物理限界

田中久陽
応用数理, 2014.

Abstract

In this article, a universal mechanism governing entrainment limit is shown to exist under weak forcings, This underlying mechanism enables us to understand how and why entrainability is maximized; maximization of the entrainment range or that of the stability of entrainment for general forcings including pulse trains, and a fundamental limit of general m : n entrainment, are clarified from a unified, global viewpoint. These entrainment limits are verified in the Hodgkin-Huxley neuron model as an example.

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References

  1. Kawasaki, K., Akiyama, Y., Komori, K., Uno, M., Takeuchi, H., Itagaki, T., Hino, Y., Kawasaki, Y., Ito, K. and Hajimiri, A., A millimeter-wave intra-connect solution, IEEE ISSCC Digest of Technical Paper, (2010), 414-415.
  2. 蔵本由紀, いわゆる「蔵本モデル」について, 応用数理, 17(2007), 175-177.
  3. Kurameto, Y., Chemical Oscillations, Waves and Turbulence, Springer, Berlin, 1984.
  4. Adler, R., A Study of Locking Phenemena in Oscillatorsm, Proc. IRE, 34[6](1946), 351-357.
  5. Kurokawa, K., Injection Locking of Microwave Solid-State Oscillators, Proc. IEEE, 61[10](1973), 1386-1410.
  6. Daikoku, K. and Mizushima, Y., Properties of Injection Locking in the Non-Linear Oscillator, Int. J. Electronics, 31[3](1971), 279-292.
  7. Yamamoto, K. and Fujishima, M., A 44-μW 4.3-GHz Injection-Locked Frequency Divider with 2.3-GHz Locking Range, IEEE J. Solid-State Circuits, 40[3](2005), 671-677.
  8. Kazimierczuk, M. K., Krizhanovski, V. G., Rassokhina, J. V. and Chernov, D. V., Injection-Locked Class-E Oscillator, IEEE Trans. Circuits and Systems I, 53[6](2006), 1214-1222.
  9. Hoppensteadt, F. C. and Izhikevich, E. M., Weakly Connected Neural Networks, Springer, New York, 1997.
  10. Hajimiri, A. and Lee, T. H., A General Theory of Phase Noise in Electrical Oscillators, IEEE J. Solid-State Circuits, 33[2](1998), 179--194.
  11. Bhansali, P. and Roychowdhury, J., Gen-Adler: the Generalized Adler's Equation for Injection Locking Analysis in Oscillators, in Proc. IEEE Asia and South Pacific Design Automation Conference, (2009), 522--527.
  12. Tanaka, H.-A., Hasegawa, A., Mizuno, H. and Endo, T., Synchronizability of distributed clock oscillators, IEEE Trans. Circuits and Systems I: Fundamental Theory and Applications, 49[9](2002), 1271-1278.
  13. Nagashima, T., Wei, X., Tanaka, H.-A. and Sekiya, H., Numerical derivations of locking ranges for injection-locked class-E oscillator, in Proc. IEEE 10th International Conference on Power Electronics and Drive Systems, (2013), 1021-1024.
  14. 太田大輔, 田中久陽, 毎野裕亮, 同期現象の解析に必要な位相方程式の導出アルゴリズムに関する比較検討, 電子情報通信学会論文誌A, 89[3](2006), 190-198.
  15. Harada, T., Tanaka, H.-A., Hankins, M. J. and Kiss, I. Z., Optimal Waveform for the Entrainment of a Weakly forced Ooscillator, Phys. Rev. Lett. 105[8](2010), 088301.
  16. Zlotnik, A., Chen, Y., Kiss, I. Z., Tanaka, H.-A. and Li, J. S., Optimal Waveform for Fast Entrainment of Weakly Forced Nonlinear Oscillators, Phys. Rev. Lett., 111[2](2013), 024102.
  17. Tanaka, H.-A., Optimal entrainment with smooth, pulse, and square signals in weakly forced nonlinear oscillators, Physica D, Accepted(2014)
  18. Rudin, W., Real and Complex Analysis, third ed., McGraw-Hill, New York, 1987, 63-65.
  19. Tsallis, C., Introduction to Nonextensive Statistical Mechanics, Springer, New York, 2009.
  20. Tanaka, H.-A., Synchronization limit of weakly forced nonlinear oscillators, Fast Track Communications in J. Phys. A, Accepted(2014).
  21. 福島直人, 萩原一郎, エネルギ収支に着目した新しい最適制御理論の構築とその応用,応用数理,17[2](2007), 138-154.
  22. 福島直人, 萩原一郎, 工ネルギー最適制御理論 : 最適制御理論の新しい枠組みとその発展性について, 応用数理 21[4](2011), 259-275.
  23. Li, J. S., Ruths, J., Yu, T. Y., Arthanari, H. and Wagner, G., Optimal pulse design in quantum control: A unified computational method, Proc. of the National Academy of Sciences, 108[5](2011), 1879-1884.
  24. http://synchro4.ee.uec.ac.jp/