Yan, Jianping; Li, Changpin Generalized projective synchronization of a unified chaotic system. (English) Zbl 1073.65147 Chaos Solitons Fractals 26, No. 4, 1119-1124 (2005). Summary: A simple but efficient control technique of the generalized projective synchronization is applied to a unified chaotic system. Numerical simulations show that this method works very well, which can also be applied to other chaotic systems. Cited in 55 Documents MSC: 65P20 Numerical chaos 37M05 Simulation of dynamical systems 37D45 Strange attractors, chaotic dynamics of systems with hyperbolic behavior Keywords:generalized projective synchronization; unified chaotic system; numerical examples PDFBibTeX XMLCite \textit{J. Yan} and \textit{C. Li}, Chaos Solitons Fractals 26, No. 4, 1119--1124 (2005; Zbl 1073.65147) Full Text: DOI References: [1] Pecora, L. M.; Carroll, T. L., Phys Rev Lett, 64, 821 (1990) [2] Kapitaniak, T., Chaos, Solitons & Fractals, 2, 519 (1992) [3] Kapitaniak, T., Phys Rev E, 50, 1642 (1994) [4] Stefanski, A.; Kapitaniak, T., Chaos, Solitons and Fractals, 40, 175 (2003) [5] González-Miranda, J. M., Phys Rev E, 53, R5 (1996) [6] Mainieri, R.; Rehacek, J., Phys Rev Lett, 82, 3042 (1999) [7] Li, Z.; Xu, D., Phys Lett A, 282, 175 (1990) [8] Xu, D.; Li, Z., Chaos, 11, 439 (2001) [9] Xu, D.; Li, Z., Int J Bifurcat Chaos, 12, 1395 (2002) [10] Xu, D.; Chee, C. Y., Phys Rev E, 66, 046218 (2002) [11] Xu, D.; Ong, W. L.; Li, Z., Phys Lett A, 305, 167 (2002) [12] Chee, C. Y.; Xu, D., Phys Lett A, 318, 112 (2003) [13] Xu, D.; Chee, C. Y.; Li, C. P., Chaos, Solitons and Fractals, 22, 175 (2004) [14] Afraimovich, V. S.; Verichev, N. N.; Rabinovich, M. I., Izvestiya Vysshikh Uchebnykh Zavedenii Radiofizika, 29, 9, 1050 (1986) [15] Rulkov, N. F.; Sushchik, M. M.; Tsimring, L. S.; Abarbanel, H. D.I., Phys Rev E, 51, 980 (1995) [16] Kocarev, L.; Parlitz, U., Phys Rev Lett, 76, 1816 (1996) [17] Abarbanel, H. D.I.; Rulkov, N. F.; Sushchik, M. M., Phys Rev E, 53, 4528 (1996) [18] Yan, J. P.; Li, C. P., Chaos, Solitons and Fractals, 23, 1683 (2005) [19] Li, C. P.; Chen, G., Chaos, 14, 2, 343 (2004) [20] Li, C. P.; Xia, X., Chaos, 14, 3 (2004) [21] Yan JP, Li CP. On generalized projective synchronization for the chaotic Lorenz system and the chaotic Chen system. J Shanghai Univ, accepted; Yan JP, Li CP. On generalized projective synchronization for the chaotic Lorenz system and the chaotic Chen system. J Shanghai Univ, accepted [22] Lu, J.; Wu, X. Q.; Lü, J. H., Phys Lett A, 305, 365 (2002) [23] Lu, J.; Tao, C.; Lü, J. H., Chin Phys Lett, 19, 5, 632 (2002) [24] Tao, C. H.; Lu, J. A., Acta Phys Sin, 52, 2, 281 (2003) [25] Lorenz, E. N., J Atmos Sci, 20, 130 (1963) [26] Chen, G. R.; Ueta, T., Int J Bifurcat Chaos, 9, 1465 (1999) [27] Li, C. P.; Chen, G., Int J Bifurcat Chaos, 13, 1609 (2003) [28] Li, C. P.; Peng, G. J., Chaos, Solitons & Fractals, 22, 443 (2004) [29] Lü, J. H.; Chen, G.; Chen, D.; Čelikovshý, S., Int J Bifurcat Chaos, 12, 2917 (2002) This reference list is based on information provided by the publisher or from digital mathematics libraries. Its items are heuristically matched to zbMATH identifiers and may contain data conversion errors. In some cases that data have been complemented/enhanced by data from zbMATH Open. This attempts to reflect the references listed in the original paper as accurately as possible without claiming completeness or a perfect matching.