On uniform polynomial splitting of variational nonautonomous difference equations in Banach spaces

[1] B. Aulbach, J. Kalkbrenner, Exponential forward splitting for noninvertible difference equation, Comput. Math. Appl. 42 (2001), 743–754.10.1016/S0898-1221(01)00194-8 Search in Google Scholar

[2] L. Barreira, C. Valls, Polynomial growth rates, Nonlinear Anal. 71 (2009), 5208–5219.10.1016/j.na.2009.04.005 Search in Google Scholar

[3] A.J.G. Bento, C.M. Silva, Stable manifolds for nonuniform polynomial dichotomies, J. Funct. Anal. 257 (2009), 122–148.10.1016/j.jfa.2009.01.032 Search in Google Scholar

[4] L.E. Biriş, T. Ceauşu, C. L. Mihiţ, On uniform exponential splitting of variational nonautonomous difference equations in Banach spaces, In: Elaydi, S., Pötzsche, C., Sasu, A. (eds) Difference Equations, Discrete Dynamical Systems and Applications. ICDEA 2017. Springer Proceedings in Mathematics & Statistics, vol. 287. Springer, 199–213.10.1007/978-3-030-20016-9_7 Search in Google Scholar

[5] L. E. Biriş, T. Ceauşu, C. L. Mihiţ, I.-L. Popa, Uniform exponential trisplitting – a new criterion for discrete skew-product semiflows, Electron. J. Qual. Theory Differ. Equ. 70 (2018), 1–22.10.14232/ejqtde.2019.1.70 Search in Google Scholar

[6] C. Chicone, Y. Latushkin, Evolution Semigroups in Dynamical Systems and Differential Equations, Math. Surveys Monogr. 70, Amer. Math. Soc. 1999.10.1090/surv/070 Search in Google Scholar

[7] S. N. Chow, H. Leiva, Two definitions of exponential dichotomy for skew-product semiflows in Banach spaces, Proc. Amer. Math. Soc. 124 (1996), 1071–1081.10.1090/S0002-9939-96-03433-8 Search in Google Scholar

[8] R. Datko, Uniform asymptotic stability of evolutionary processes in Banach space, SIAM J. Math. Anal. 3 (1972), 428–445.10.1137/0503042 Search in Google Scholar

[9] D. Dragičević, Admissibility and nonuniform polynomial dichotomies, Math. Nachr. 293 2(2020), 226–243.10.1002/mana.201800291 Search in Google Scholar

[10] D. Dragičević, A. L. Sasu, B. Sasu, Admissibility and polynomial dichotomy of discrete nonautonomous systems, Carpathian J. Math. 38 2(2022), 737–762.10.37193/CJM.2022.03.18 Search in Google Scholar

[11] D. Dragičević, A. L. Sasu, B. Sasu, On polynomial dichotomies of discrete nonautonomous systems on the half-line, Carpathian J. Math. 38 2(2022), 663–680.10.37193/CJM.2022.03.12 Search in Google Scholar

[12] S. Elaydi, R. J. Sacker, Skew-product dynamical systems: applications to difference equations, Proceedings of Second Annual Celebration of Math United Arab Emirates (2005). Search in Google Scholar

[13] N. T. Huy, H. Phi, Discrete characterizations of exponential dichotomy of linear skew product semiflows over semiflows, J. Math. Anal. Appl. 362 (2010), 46–57.10.1016/j.jmaa.2009.09.062 Search in Google Scholar

[14] Y. Latushkin, R. Schnaubelt, Evolution semigroups, translation algebras and exponential dichotomy of cocycles, J. Differential Equations 159 (1999), 321-369.10.1006/jdeq.1999.3668 Search in Google Scholar

[15] M. Megan, I.-L. Popa, Exponential splitting for nonautonomous linear discrete-time systems in Banach spaces, J. Comput. Appl. Math. 312 (2017), 181–191.10.1016/j.cam.2016.03.036 Search in Google Scholar

[16] M. Megan, A.L. Sasu, B. Sasu, On uniform exponential stability of linear skew-product semiflows in Banach spaces, Bull. Belg. Math. Soc. Simon Stevin 9(1), (2002), 143–154.10.36045/bbms/1102715145 Search in Google Scholar

[17] M. Megan, A. L. Sasu, B. Sasu, Exponential instability of linear skew-product semiflows in terms of Banach function spaces, Results Math. 45 (3–4), (2004), 309–318.10.1007/BF03323385 Search in Google Scholar

[18] M. Megan, C. Stoica, Discrete asymptotic behaviors for skew-evolution semiflows on Banach spaces, Carpathian J. Math. 24 (2008), 348–355. Search in Google Scholar

[19] C. Pötzsche, Geometric theory of discrete nonautonomous dynamical systems, Springer, 2010.10.1007/978-3-642-14258-1 Search in Google Scholar

[20] R. J. Sacker, G. R. Sell, Lifting properties in skew-product flows with applications to differential equations, Mem. Amer. Math. Soc. 11 (1977), no. 190, 67 pp.10.1090/memo/0190 Search in Google Scholar