(2017) Adaptive Output Synchronization with Uncertain Leader. In: Synchronization Control for Large-Scale Network Systems. Studies in Systems, Decision and Control, vol 76.
- Du, H., Li, S., & Shi, P. (2012). Robust consensus algorithm for second-order multi-agent systems with external disturbances. International Journal of Control, 85(12), 1913–1928.MathSciNetCrossRefzbMATHGoogle Scholar
- Li, Z., Duan, Z., & Lewis, F. L. (2014). Distributed robust consensus control of multi-agent systems with heterogeneous matching uncertainties. Automatica, 50(3), 883–889.MathSciNetCrossRefzbMATHGoogle Scholar
- Shi, P., & Shen, Q. (2015). Cooperative control of multi-agent systems with unknown state-dependent controlling effects. IEEE Transaction on Automation Science and Engineering, 12(3), 827–834.CrossRefGoogle Scholar
- Yang, T., Meng, Z., Dimarogonas, D. V., & Johansson, K. H. (2014). Global consensus for discrete-time multi-agent systems with input saturation constraints. Automatica, 50(2), 499–506.MathSciNetCrossRefGoogle Scholar
- Yu, W., Chen, G., Cao, M., & Kurths, J. (2010). Second-order consensus for multiagent systems with directed topologies and nonlinear dynamics. IEEE Transactions on Systems, Man, and Cybernetics, Part B: Cybernetics, 40(3), 881–891.CrossRefGoogle Scholar
- Yu, W., Chen, G., & Lu, J. (2009). On pinning synchronization of complex dynamical networks. Automatica, 45(2), 429–435.MathSciNetCrossRefzbMATHGoogle Scholar
- Yu, W., Chen, G., Ren, W., Kurths, J., & Zheng, W. (2011). Distributed higher order consensus protocols in multiagent dynamical systems. IEEE Transactions on Circuits and Systems I: Regular Papers, 58(8), 1924–1932.MathSciNetCrossRefGoogle Scholar
- Zhou, X., Shi, P., Lim, C., Yang, C., & Gui, W. (2015). Event based guaranteed cost consensus for distributed multi-agent systems. Journal of the Franklin Institute, 352, 3546–3563.MathSciNetCrossRefGoogle Scholar
- Zhu, W., Jiang, Z., & Feng, G. (2014). Event-based consensus of multi-agent systems with general linear models. Automatica, 50(2), 552–558.MathSciNetCrossRefGoogle Scholar
- Ren, W., & Beard, R. (2007). Distributed consensus in multi-vehicle cooperative control: Theory and applications. Berlin: Springer.zbMATHGoogle Scholar
- Kim, H., Shim, H., & Seo, J. H. (2011). Output consensus of heterogeneous uncertain linear multi-agent systems. IEEE Transactions on Automatic Control, 56(1), 200–206.MathSciNetCrossRefGoogle Scholar
- Wieland, P., Sepulchre, R., & Allgöwer, F. (2011). An internal model principle is necessary and sufficient for linear output synchronization. Automatica, 47(5), 1068–1074.MathSciNetCrossRefzbMATHGoogle Scholar
- Ni, W., & Cheng, D. (2010). Leader-following consensus of multi-agent systems under fixed and switching topologies. Systems & Control Letters, 59(3), 209–217.MathSciNetCrossRefzbMATHGoogle Scholar
- Huang, J. (2004). Nonlinear output regulation: Theory and applications (Vol. 8). Philadelphia: SIAM.Google Scholar
- Isidori, A., Marconi, D. L., & Serrani, D. A. (2003). Fundamentals of internal-model-based control theory. Berlin: Springer.Google Scholar
- Wu, Y., Wu, Z., & Su, H. (2015). Robust output synchronisation of non-identical linear agents via internal model principle. IET Control Theory & Applications, 9(12), 1755–1765.MathSciNetCrossRefGoogle Scholar
- Su, Y., & Huang, J. (2013). Cooperative adaptive output regulation for a class of nonlinear uncertain multi-agent systems with unknown leader. Systems & Control Letters, 62(6), 461–467.MathSciNetCrossRefzbMATHGoogle Scholar
- Horn, R. A., & Johnson, C. R. (2012). Matrix analysis. Cambridge: Cambridge University Press.Google Scholar
- Khalil, H. K., & Grizzle, J. (1996). Nonlinear systems (Vol. 3). Upper Saddle River, NJ: Prentice Hall.Google Scholar
- Cheresiz, V. (1973). Stability in almost-periodic systems. Siberian Mathematical Journal, 14(4), 625–627.MathSciNetCrossRefGoogle Scholar
- Lion, P. M. (1967). Rapid identification of linear and nonlinear systems. AIAA Journal, 5(10), 1835–1842.CrossRefGoogle Scholar
- Isidori, A. (1999). Nonlinear control systems (Vol. II). London: Springer.zbMATHGoogle Scholar
- Byrnes, C. I., Priscoli, F. D., & Isidori, A. (1997). Output regulation of uncertain nonlinear systems. Berlin: Springer.Google Scholar
- Isidori, A. (1992). Sistemi di controllo (Vol. II). Siderea.Google Scholar
- Ren, W., Beard, R., & Atkins, E. (2007). Information consensus in multivehicle cooperative control. IEEE Control Systems Magazine, 27(2), 71–82.CrossRefGoogle Scholar
- Chen, F., Feng, G., Liu, L., & Ren, W. (2015). Distributed average tracking of networked Euler–Lagrange systems. IEEE Transactions on Automatic Control, 2, 547–552.MathSciNetCrossRefGoogle Scholar
- Wang, X., Li, X., & Lu, J. (2010). Control and flocking of networked systems via pinning. IEEE Circuits and Systems Magazine, 10(3), 83–91.CrossRefGoogle Scholar
- Chen, F., Chen, Z., Xiang, L., Liu, Z., & Yuan, Z. (2009). Reaching a consensus via pinning control. Automatica, 45(5), 1215–1220.MathSciNetCrossRefzbMATHGoogle Scholar
- Ren, W. (2007). Multi-vehicle consensus with a time-varying reference state. Systems and Control Letters, 56(7), 474–483.MathSciNetCrossRefzbMATHGoogle Scholar
- Ren, W. (2008). On consensus algorithms for double-integrator dynamics. IEEE Transactions on Automatic Control, 53(6), 1503–1509.MathSciNetCrossRefGoogle Scholar
- Su, Y., Hong, Y., & Huang, J. (2013). A general result on the robust cooperative output regulation for linear uncertain multi-agent systems. IEEE Transactions on Automatic Control, 58(5), 1275–1279.MathSciNetCrossRefGoogle Scholar
- Su, Y., & Huang, J. (2012). Cooperative output regulation with application to multi-agent consensus under switching network. IEEE Transactions on Systems, Man, and Cybernetics, Part B: Cybernetics, 42(3), 864–875.CrossRefGoogle Scholar
- Isidori, A., Marconi, D. L., & Serrani, D. A. (2003). Fundamentals of internal-model-based control theory. Berlin: Springer.CrossRefzbMATHGoogle Scholar
- Huang, J. (2004). Nonlinear output regulation: Theory and applications (Vol. 8). Philadelphia, PA: SIAM.CrossRefzbMATHGoogle Scholar
- Isidori, A. (1999). Nonlinear control systems (Vol. II). Great Britain: Springer.zbMATHGoogle Scholar
- Wu, Y., Wu, Z., & Su, H. (2015). Robust output synchronisation of non-identical linear agents via internal model principle. IET Control Theory and Applications, 9(12), 1755–1765.MathSciNetCrossRefGoogle Scholar
- Byrnes, C. I., Priscoli, F. D., & Isidori, A. (1997). Output regulation of uncertain nonlinear systems. Berlin: Springer.CrossRefzbMATHGoogle Scholar
- Isidori, A. (1992). Sistemi di controllo (Vol. II). Rome: Siderea.Google Scholar
- Lion, P. M. (1967). Rapid identification of linear and nonlinear systems. AIAA Journal, 5(10), 1835–1842.CrossRefGoogle Scholar
- Cheresiz, V. (1973). Stability in almost-periodic systems. Siberian Mathematical Journal, 14(4), 625–627.MathSciNetCrossRefGoogle Scholar
- Khalil, H. K., & Grizzle, J. (1996). Nonlinear systems (Vol. 3). Upper Saddle River, NJ: Prentice Hall.Google Scholar