On the Ψ − Conditional Exponential Asymptotic Stability of a Nonlinear Lyapunov Matrix Differential Equation with Integral Term as Right Side

[1] R. Bellman, Introduction to Matrix Analysis, McGraw-Hill Book Company, Inc. New York, 1960. Search in Google Scholar

[2] W. A. Coppel, Stability and Asymptotic Behavior of Differential Equations, D. C. Heath and Company, Boston, 1965. Search in Google Scholar

[3] A. Diamandescu, On Ψ −stability of nonlinear Lyapunov matrix differential equations, Electronic Journal of Qualitative Theory Differential Equations, 54 (2009), 1–18.10.14232/ejqtde.2009.1.54 Search in Google Scholar

[4] A. Diamandescu, On the Ψ −Asymptotic Stability of Nonlinear Lyapunov Matrix Differential Equations, Analele Universităţii de Vest, Timişoara, Seria Matematică - Informatică, L (1) (2012), 3–25.10.2478/v10324-012-0001-8 Search in Google Scholar

[5] A. Diamandescu, On the Ψ −Conditional Asymptotic Stability of Nonlinear Lyapunov Matrix Differential Equations, Analele Universităţii de Vest, Timişoara, Seria Matematică -Informatică, LIII (2) (2015), 29–58.10.1515/awutm-2015-0013 Search in Google Scholar

[6] A. Diamandescu, On the Ψ −boundedness of the solutions of linear nonhomogeneous Lyapunov matrix differential equations, Differential Geometry - Dynamical Systems, 19 (2017), 35–44. Search in Google Scholar

[7] A. Diamandescu, On the Ψ −boundedness of the solutions of a nonlinear Lyapunov matrix differential equation, Applied Sciences, 19 (2017), 31–40. Search in Google Scholar

[8] A. Diamandescu, On the Ψ −instability of nonlinear Lyapunov matrix differential equations, Analele Universităţii de Vest, Timişoara, Seria Matematică - Informatică, XLIX (1) (2011), 21–37. Search in Google Scholar

[9] A. Diamandescu, On the Ψ −Conditional Exponential Asymptotic Stability of Nonlinear Lyapunov Matrix Differential Equations, Analele Universităţii de Vest, Timişoara, Seria Matematică - Informatică, LIV (1) (2016), 87–118.10.1515/awutm-2016-0006 Search in Google Scholar

[10] A. Diamandescu, On the Ψ − conditional exponential asymptotic stability of the solutions of a nonlinear Volterra integro-differential system, Analele Universităţii din Timişoara, Seria Matematică - Informatică, XXXX (1) (2002), 19–44. Search in Google Scholar

[11] J. R. Magnus, H. Neudecker, Matrix Differential Calculus with Applications in Statistics and Econometrics, John Wiley & Sons Ltd, Chichester, 1999. Search in Google Scholar

[12] W.E. Mahfoud, Boundedness properties in Volterra integro-differential systems, Proc. Amer. Math. Soc., 100 (1987), 37–45.10.1090/S0002-9939-1987-0883398-3 Search in Google Scholar

[13] M.S.N. Murty, G. Suresh Kumar, On dichotomy and conditioning for two-point boundary value problems associated with first order matrix Lyapunov systems, J. Korean Math. Soc. 45 (5) (2008), 1361–1378.10.4134/JKMS.2008.45.5.1361 Search in Google Scholar

[14] M.S.N. Murty, G. Suresh Kumar, On Ψ −boundedness and Ψ −stability of matrix Lyapunov systems, J. Appl. Math. Comput 26 (2008), 67–84.10.1007/s12190-007-0007-2 Search in Google Scholar

[15] M. S. N. Murty, B. V. Apparao, G. Suresh Kumar, Controllability, observability and realizability of matrix Lyapunov systems, Bull. Korean Math. Soc. 43 (1) (2006), 149 - 159.10.4134/BKMS.2006.43.1.149 Search in Google Scholar

[16] M.S.N. Murty, G. Suresh Kumar, On Ψ −bounded solutions for non-homogeneous matrix Lyapunov systems on R, Electronic Journal of Qualitative Theory Differential Equations, 62 (2009), 1–12.10.14232/ejqtde.2009.1.62 Search in Google Scholar

[17] O. Perron, Die Stabilitätsfrage bei Differentialgleichungen, Math. Z. 32 (1930), 703–728.10.1007/BF01194662 Search in Google Scholar

[18] G. Suresh Kumar, B.V. Appa Rao, M.S.N. Murty, On Ψ −Conditional Asymptotic Stability of First Order Non-Linear Matrix Lyapunov Systems, Int. J. Nonlinear Anal. Appl. 4 (1) (2013), 7–20. Search in Google Scholar