On Stability Analysis of Riemann-Liouville Fractional Singular Systems with Delays
Year 2022,
, 969 - 975, 26.12.2022
Erdal Korkmaz
,
Meltem Kaya
Abstract
In this study, two lagged fractional order singular neutral differential equations are considered. Using the advantage of the association property of the Riemann -Liouville derivative, the derivative of the appropriate Lyapunov function is calculated. Then, with the help of LMI, sufficient conditions for asymptotic stability of zero solutions are obtained.
References
- References
- [1] Podlubny I. Fractional Differential Equations, Academic Press, New York, 1999.
- [2] Hale J.K. Ordinary Differantial Equations, Wiley Interscience, New York, 1969.
- [3] Hale J.K. Theory of Functional Differential Equations, Springer-Verlag, New York, 1977.
- [4] Kilbas A., Srivastava H., Trujillo J. Theory and Application of Fractional Differential Equations, Elsevier, New York, 2006.
- [6] Deng W.H., Li C.P., Lü J.H. Stability analysis of linear fractional differential system with multiple time delays, Nonlinear Dynamics. 48, 409–416, 2007.
- [7] Lu J.G., Chen G.R. Robust stability and stabilization of fractional-order interval systems: An LMI approach, IEEE Transactions on Automatic Control. 54 (6), 1294–1299, 2009.
- [8] Qian D., Li C., Agarwal R.P., Wong P.J.Y. Stability analysis of fractional differential system with Riemann-Liouville derivative, Mathematical and Computer Modelling 52, 862–874, 2010.
- [9] Qian W., Li T., Cong S., Fei S.M. Improved stability analysis on delayed neural networks with linear fractional uncertainties, Applied Mathematics and Computation, 217, 3596–3606, 2010 .
- [10] Li Y., Chen Y.Q., Podlubny I. Stability of fractional-order nonlinear dynamic systems: Lyapunov direct method and generalized Mittag–Leffler stability, Computers & Mathematics with Applications, 59 (5), 1810–1821, 2010.
- [11] Liu S., Li X., Jiang W., Zhou X.F. Mittag-Leffler stability of nonlinear fractional neutral singular systems, Communications in Nonlinear Science and Numerical Simulation. 17, 3961–3966, 2012.
- [12] Aguila-Camacho N., Duarte-Mermoud M., Gallegos J. Lyapunov functions for fractional order systems, Communications in Nonlinear Science and Numerical Simulation. 19 (9), 2951–2957, 2014.
- [13] Li H., Zhong S., Li H. Asymptotic stability analysis of fractional-order neutral systems with time delay, Advances in Difference Equations. 2015 (1), 325–335, 2015.
- [14] Chen L. P., He Y.G., Chai Y., Wu R.C. New results on stability and stabilization of a class of nonlinear fractional-order systems, Nonlinear Dynamics. 75, 633–641, 2014.
- [15] Liu S., Li X., Zhou X.F., Jiang W. Synchronization analysis of singular dynamical networks with unbounded time-delays, Advances in Difference Equations. 193, 1–9, 2015.
- [16] Duarte-Mermoud M., Aguila-Camacho N., Gallego, J., Castro-Linares R. Using general quadratic Lyapunov functions to prove Lyapunov uniform stability for fractional order systems, Communications in Nonlinear Science and Numerical Simulation. 22, 650–659, 2015.
- [17] Liu S., Jiang W., Li X., Zhou X.F. Lyapunov stability analysis of fractional nonlinear systems, Applied Mathematics Letters. 51, 13–19, 2016.
- [18] Liu S., Wu X., Zhou X.F., Jiang W. Asymptotical stability of Riemann-Liouville fractional nonlinear systems, Nonlinear Dynamics. 86, 65–71, 2016.
- [19] Liu S., Zhou X.F., Li X., Jiang W. Stability of fractional nonlinear singular systems and its applications in synchronization of complex dynamical networks, Nonlinear Dynamics. 84, 2377–2385, 2016.
- [20] Chen L.P., Liu C., Wu R.C., He Y.G., Chai Y. Finite-time stability criteria for a class of fractional-order neural networks with delay, Neural Computing and Applications. 27, 549–556, 2016.
- [21] Liu S., Wu X., Zhang Y.J., Yang R. Asymptotical stability of Riemann–Liouville fractional neutral systems, Applied Mathematics Letters. 69, 168–173, 2017.
- [22] Liu S., Zhou X.F., Li X., Jiang W. Asymptotical stability of Riemann-Liouville fractional singular systems with multiple time-varying delays, Applied Mathematics Letters. 65, 32–39, 2017.
- [23] Priyadharsini S., Govindaraj V. Asymptotic stability of caputo fractional singular differential systems with multiple delays. Discontinuity, Nonlinearity, and complexity, 7(3), 243-251, 2018.
- [24] Korkmaz E., Özdemir A. On Stability of Fractional Differential Equations with Lyapunov Functions, Muş Alparslan Üniversitesi Fen Bilimleri Dergisi. 7, 635–638, 2019.
- [25] Altun Y., Tunç C. On the asymptotic stability of a nonlinear fractional-order system with multiple variable delays, Applications and Applied Mathematics. 15, 458–468, 2020.
- [5] Heymans N., Podlubny I. Physical interpretation of initial conditions for fractional differential equations with Riemann-Liouville fractional derivatives, Rheologica Acta. 45 (5), 765–771, 2006.
Gecikmeli Riemann-Liouville Kesirli Singüler Sistemlerin Kararlılık Analizi
Year 2022,
, 969 - 975, 26.12.2022
Erdal Korkmaz
,
Meltem Kaya
Abstract
Bu çalışmada gecikmeli kesirli mertebeden singüler nötr iki diferansiyel denklem ele alınır. Riemann-Liouville türevin birleşme özelliğinin avanatajı kullanılarak uygun Lyapunov fonksiyonun türevi hesaplanır. Sonra LMI yardımıyla sıfır çözümlerin asimptotik kararlılığı için yeter şartlar elde edilir.
References
- References
- [1] Podlubny I. Fractional Differential Equations, Academic Press, New York, 1999.
- [2] Hale J.K. Ordinary Differantial Equations, Wiley Interscience, New York, 1969.
- [3] Hale J.K. Theory of Functional Differential Equations, Springer-Verlag, New York, 1977.
- [4] Kilbas A., Srivastava H., Trujillo J. Theory and Application of Fractional Differential Equations, Elsevier, New York, 2006.
- [6] Deng W.H., Li C.P., Lü J.H. Stability analysis of linear fractional differential system with multiple time delays, Nonlinear Dynamics. 48, 409–416, 2007.
- [7] Lu J.G., Chen G.R. Robust stability and stabilization of fractional-order interval systems: An LMI approach, IEEE Transactions on Automatic Control. 54 (6), 1294–1299, 2009.
- [8] Qian D., Li C., Agarwal R.P., Wong P.J.Y. Stability analysis of fractional differential system with Riemann-Liouville derivative, Mathematical and Computer Modelling 52, 862–874, 2010.
- [9] Qian W., Li T., Cong S., Fei S.M. Improved stability analysis on delayed neural networks with linear fractional uncertainties, Applied Mathematics and Computation, 217, 3596–3606, 2010 .
- [10] Li Y., Chen Y.Q., Podlubny I. Stability of fractional-order nonlinear dynamic systems: Lyapunov direct method and generalized Mittag–Leffler stability, Computers & Mathematics with Applications, 59 (5), 1810–1821, 2010.
- [11] Liu S., Li X., Jiang W., Zhou X.F. Mittag-Leffler stability of nonlinear fractional neutral singular systems, Communications in Nonlinear Science and Numerical Simulation. 17, 3961–3966, 2012.
- [12] Aguila-Camacho N., Duarte-Mermoud M., Gallegos J. Lyapunov functions for fractional order systems, Communications in Nonlinear Science and Numerical Simulation. 19 (9), 2951–2957, 2014.
- [13] Li H., Zhong S., Li H. Asymptotic stability analysis of fractional-order neutral systems with time delay, Advances in Difference Equations. 2015 (1), 325–335, 2015.
- [14] Chen L. P., He Y.G., Chai Y., Wu R.C. New results on stability and stabilization of a class of nonlinear fractional-order systems, Nonlinear Dynamics. 75, 633–641, 2014.
- [15] Liu S., Li X., Zhou X.F., Jiang W. Synchronization analysis of singular dynamical networks with unbounded time-delays, Advances in Difference Equations. 193, 1–9, 2015.
- [16] Duarte-Mermoud M., Aguila-Camacho N., Gallego, J., Castro-Linares R. Using general quadratic Lyapunov functions to prove Lyapunov uniform stability for fractional order systems, Communications in Nonlinear Science and Numerical Simulation. 22, 650–659, 2015.
- [17] Liu S., Jiang W., Li X., Zhou X.F. Lyapunov stability analysis of fractional nonlinear systems, Applied Mathematics Letters. 51, 13–19, 2016.
- [18] Liu S., Wu X., Zhou X.F., Jiang W. Asymptotical stability of Riemann-Liouville fractional nonlinear systems, Nonlinear Dynamics. 86, 65–71, 2016.
- [19] Liu S., Zhou X.F., Li X., Jiang W. Stability of fractional nonlinear singular systems and its applications in synchronization of complex dynamical networks, Nonlinear Dynamics. 84, 2377–2385, 2016.
- [20] Chen L.P., Liu C., Wu R.C., He Y.G., Chai Y. Finite-time stability criteria for a class of fractional-order neural networks with delay, Neural Computing and Applications. 27, 549–556, 2016.
- [21] Liu S., Wu X., Zhang Y.J., Yang R. Asymptotical stability of Riemann–Liouville fractional neutral systems, Applied Mathematics Letters. 69, 168–173, 2017.
- [22] Liu S., Zhou X.F., Li X., Jiang W. Asymptotical stability of Riemann-Liouville fractional singular systems with multiple time-varying delays, Applied Mathematics Letters. 65, 32–39, 2017.
- [23] Priyadharsini S., Govindaraj V. Asymptotic stability of caputo fractional singular differential systems with multiple delays. Discontinuity, Nonlinearity, and complexity, 7(3), 243-251, 2018.
- [24] Korkmaz E., Özdemir A. On Stability of Fractional Differential Equations with Lyapunov Functions, Muş Alparslan Üniversitesi Fen Bilimleri Dergisi. 7, 635–638, 2019.
- [25] Altun Y., Tunç C. On the asymptotic stability of a nonlinear fractional-order system with multiple variable delays, Applications and Applied Mathematics. 15, 458–468, 2020.
- [5] Heymans N., Podlubny I. Physical interpretation of initial conditions for fractional differential equations with Riemann-Liouville fractional derivatives, Rheologica Acta. 45 (5), 765–771, 2006.