References
- Aeyels, D., & Leenheer, P.D. (2002). Extension of the Perron-Frobenius theorem to homogeneous systems. SIAM Journal on Control and Optimization, 41(2), 563–582.
- Bokharaie, V.S., Mason, O., & Verwoerd, M. (2010). D-stability and delay-independent stability of homogeneous cooperative systems. IEEE Transactions on Automatic Control, 55(12), 2882–2885.
- Caccetta, L., Foulds, L.R., & Rumchev, V.G. (2004). A positive linear discrete-time model of capacity planning and its controllability properties. Mathematical and Computer Modeling, 40(1–2), 217–226.
- Carson, E.R., Cobelli, C., & Finkelstein, L. (1981). Modeling and identification of metabolic systems. American Journal of Physiology, 240(3), R120–R129.
- Caswell, H. (2001). Matrix population models: Construction, analysis and interpretation. Sunderland, MA: Sinauer Associates.
- Dong, J. (2015a). Stability of switched positive nonlinear systems. International Journal of Robust and Nonlinear Control, 26(14), 3118–3129.
- Dong, J. (2015b). On the decay rates of homogenous positive systems of any degree with time-varying delays. IEEE Transactions on Automatic Control, 60(11), 2983–2988.
- Feyzmahdavian, H.R., Charalambous, T., & Johansson, M. (2014). Exponential stability of homogeneous positive systems of degree one with time-varying delays. IEEE Transactions on Automatic Control, 59(6), 1594–1599.
- Gabriele, B., Pasquale, C., & Giuseppina, D. (2015). Positive solutions for a nonlinear parameter-depending algebraic system. Electronic Journal of Differential Equations, 2015, 1–14.
- Hespanha, J.P., & Morse, A.S. (1999). Stability of switched systems with average dwell time. In 38th IEEE Conference of Decision and Control (pp. 2655–2660). Phoenix, AZ. 07–10 December 1999.
- Jadbabaie, A., Lin, J., & Morse, A.S. (2003). Coordination of groups of mobile autonomous agents using nearest neighbor rules. IEEE Transactions on Automatic Control, 48(6), 988–1001.
- Kaczorek, T. (2007). The choice of the forms of Lyapunov functions for a positive 2D Roesser model. International Journal of Applied Mathematics and Computer Science, 17(4), 471–475.
- Liberzon, D. (2003). Switching in systems and control. Berlin: Birkhauser.
- Liu, X. (2015). Stability analysis of a class of nonlinear positive switched systems with delays. Nonlinear Analysis: Hybrid Systems, 16, 1–12.
- Liu, T., Wu, B., Liu, L., & Wang, Y. (2015). Asynchronously finite-time control of discrete impulsive switched positive time-delay systems. Journal of the Franklin Institute, 352(10), 4503–4514.
- Lu, J., Ho, D., & Kurths, J. (2009). Consenus over directed static networks with arbitrary finite communication delays. Physical Review E, 80(6), 066121.
- Ma, R., Gao, H., & Lu, Y. (2016). Radial positive solutions of nonlinear elliptic systems with Neumann boundary conditions. Journal of Mathematical Analysis and Applications, 434(2), 1240–1252.
- Mao, Y., Zhang, H., & Dang, C. (2012). Stability analysis and constrained control of a class of fuzzy positive systems with delays using linear copositive lyapunov functional. Circuits, Systems and Signal Processing, 31(5), 1863–1875.
- Mao, Y., Zhang, H., & Xu, S. (2014). Exponential stability and asynchronous stabilization of a class of switched nonlinear system via T-S fuzzy model. IEEE Transactions on Fuzzy Systems, 22(4), 817–828.
- Mason, O., & Verwoerd, M. (2009). Observations on the stability properties of cooperative systems. Systems and Control Letters, 58(6), 461–467.
- Munz, U., Papachristodoulou, A., & Allgower, F. (2011). Consensus in multi-agent systems with coupling delays and switching topology. IEEE Transactions on Automatic Control, 56(12), 2976–2982.
- Shorten, R., Leith, D., Foy, J., & Kilduff, R. (2003). Towards an analysis and design framework for congestion control in communication networks. 12th Yale Workshop Adaptive and Learning Systems. New Haven, CT.
- Shorten, R., Wirth, F., & Leith, D. (2006). A positive systems model of TCP-like congestion control: Asymptotic results. IEEE/ACM Transactions on Networking, 14(3), 616–629.
- Smith, H. (1995). Monotone dynamical systems: An introduction to the theory of competitive and cooperative systems. Providence, RI: American Mathematical Society.
- Wang, Y., Sun, X., & Wu, B. (2015). Lyapunov-Krasovskii functionals for switched nonlinear input delay systems under asynchronous switching. Automatica, 61, 126–133.
- Wang, D., Wang, W., & Shi, P. (2009). Exponential H∞ filtering for switched linear systems with interval time-varying delay. International Journal of Robust and Nonlinear Control, 19(5), 532–551.
- Wang, Y., Zhao, J., & Jiang, B. (2013). Stabilization of a class of switched linear neutral systems under asynchronous switching. IEEE Transactions on Automatic Control, 58(8), 2114–2119.
- Xiang, M., Xiang, Z., & Karimi, H.R. (2014a). Asynchronous L1 control of delayed switched positive systems with mode-dependent average dwell time. Information Sciences, 278(1), 703–714.
- Xiang, M., Xiang, Z., & Karimi, H.R. (2014b). Stabilization of positive switched systems with time-varying delays under asynchronous switching. International Journal of Control, Automation, and Systems, 12(5), 939–947.
- Xiang, W., & Xiao, J. (2014). Stabilization of switched continuous-time systems with all modes unstable via dwell time switching. Automatica, 3(50), 940–945.
- Xie, G., & Wang, L. (2005). Stabilization of switched linear systems with time-delay in detection of switching signal. Journal of Mathematical Analysis and Applications, 305(6), 277–290.
- Zhang, J., Han, Z., Zhu, F., & Huang, J. (2013). Stability and stabilization of positive switched systems with mode-dependent average dwell time. Nonlinear Analysis: Hybrid Systems, 9(1), 42–55.
- Zhang, J., & Hang, Z. (2013). Robust stabilization of switched positive linear systems with uncertainties. International Journal of Control, Automation, and Systems, 11(1), 41–47.
- Zhang, W., & Yu, L. (2009). Stability analysis for discrete-time switched time-delay systems. Automatica, 45(10), 2265–2271.
- Zhao, X., Shi, P., & Zhang, L. (2012). Asynchronously switched control of a class of slowly switched linear systems. Systems and Control Letters, 61(12), 1151–1156.
- Zhao, X., Zhang, L., & Shi, P. (2013). Stability of a class of switched positive linear time-delay systems. International Journal of Robust and Nonlinear Control, 23(5), 578–589.
- Zhao, X., Zhang, L., Shi, P., & Liu, M. (2012). Stability of switched positive linear systems with average dwell time switching. Automatica, 48(6), 1132–1137.