Attractivity for fractional evolution equations with almost sectorial operators
-
Yong Zhou
Abstract
In this paper, we initiate the question of the attractivity of solutions for fractional evolution equations with almost sectorial operators. We establish sufficient conditions for the existence of globally attractive solutions for the Cauchy problems in cases that semigroup is compact as well as noncompact. Our results essentially reveal certain characteristics of solutions for fractional evolution equations, which are not possessed by integer order evolution equations.
Acknowledgements
The authors are very grateful to the editor and reviewers for their valuable comments. The work was supported by the National Natural Science Foundation of China (No. 11671339).
References
[1] J. Banaś, D. O’Regan, On existence and local attractivity of solutions of a quadratic Volterra integral equation of fractional order. J. Math. Anal. Appl. 345, No 1 (2008), 573–582.10.1016/j.jmaa.2008.04.050Suche in Google Scholar
[2] E. Bazhlekova, Existence and uniqueness results for a fractional evolution equation in Hilbert space. Fract. Calc. Appl. Anal. 15, No 2 (2012), 232–243; 10.2478/s13540-012-0017-0; https://www.degruyter.com/view/j/fca.2012.15.issue-2/issue-files/fca.2012.15.issue-2.xml.Suche in Google Scholar
[3] A.N. Carvalho, T. Dlotko, M.J.D. Nescimento, Nonautonomous semilinear evolution equations with almost sectorial operators. J. Evol. Equs. 8 (2008), 631–659.10.1007/s00028-008-0394-3Suche in Google Scholar
[4] F. Chen, J.J. Nieto, Y. Zhou, Global attractivity for nonlinear fractional differential equations. Nonlinear Anal. RWA13, No 1 (2012), 287–298.10.1016/j.nonrwa.2011.07.034Suche in Google Scholar
[5] K. Diethelm, The Analysis of Fractional Differential Equations. Springer, Berlin (2010).10.1007/978-3-642-14574-2Suche in Google Scholar
[6] V.E. Fedorov, N.D. Ivanova, Identification problem for degenerate evolution equations of fractional order. Fract. Calc. Appl. Anal. 20, No 3 (2017), 706–721; 10.1515/fca-2017-0037; https://www.degruyter.com/view/j/fca.2017.20.issue-3/issue-files/fca.2017.20.issue-3.xml.Suche in Google Scholar
[7] R. Gorenflo, Y. Luchko, F. Mainardi, Analytical properties and applications of the Wright function. Fract. Calc. Appl. Anal. 2 (1999), 383–415.Suche in Google Scholar
[8] W. Guo, A generalization and application of Ascoli-Arzela theorem. J. Sys. Sci. & Math. Scis. 22, No 1 (2002), 115–122.Suche in Google Scholar
[9] M. Jleli, M. Kirane, B. Samet, Nonexistence results for a class of evolution equations in the Heisenberg group. Fract. Calc. Appl. Anal. 18, No 3 (2015), 717–734; 10.1515/fca-2015-0044; https://www.degruyter.com/view/j/fca.2015.18.issue-3/issue-files/fca.2015.18.issue-3.xml.Suche in Google Scholar
[10] A.A. Kilbas, H.M. Srivastava, J.J. Trujillo, Theory and Applications of Fractional Differential Equations. Elsevier, Amsterdam (2006).Suche in Google Scholar
[11] V. Kiryakova, Generalized Fractional Calculus and Applications. Longman Scientific & Technical, Harlow (1994).Suche in Google Scholar
[12] V. Kiryakova, The multi-index Mittag-Leffler functions as an important class of special functions of fractional calculus. Comput. Math. Appl. 59, No 5 (2010), 1885–1895.10.1016/j.camwa.2009.08.025Suche in Google Scholar
[13] J. Losada, J.J. Nieto, E. Pourhadi, On the attractivity of solutions for a class of multi-term fractional functional differential equations. J. Comput. Appl. Math. 312 (2017), 2–12.10.1016/j.cam.2015.07.014Suche in Google Scholar
[14] Y. Luchko, M. Yamamoto, On the maximum principle for a time-fractional diffusion equation. Fract. Calc. Appl. Anal. 20, No 5 (2017), 1131–1145; 10.1515/fca-2017-0060; https://www.degruyter.com/view/j/fca.2017.20.issue-5/issue-files/fca.2017.20.issue-5.xml.Suche in Google Scholar
[15] F. Mainardi, P. Paraddisi, R. Gorenflo, Probability distributions generated by fractional diffusion equations. In: Econophysics: An Emerging Science, J. Kertesz, I. Kondor (Eds.), Kluwer, Dordrecht (2000).Suche in Google Scholar
[16] H. Markus, The Functional Valculus for Sectorial Operators. Birkhauser-Verlag, Basel (2006).Suche in Google Scholar
[17] F. Periago, B. Straub, A functional calculus for almost sectorial operators and applications to abstract evolution equations. J. Evol. Equ. 2 (2002), 41–68.10.1007/s00028-002-8079-9Suche in Google Scholar
[18] I. Podlubny, Fractional Differential Equations. Academic Press, San Diego (1999).Suche in Google Scholar
[19] R.N. Wang, D.H. Chen, T.J. Xiao, Abstract fractional Cauchy problems with almost sectorial operators. J. Diff. Equa. 252 (2012), 202–235.10.1016/j.jde.2011.08.048Suche in Google Scholar
[20] Y. Zhou, Basic Theory of Fractional Differential Equations. World Scientific, Singapore (2014).10.1142/9069Suche in Google Scholar
[21] Y. Zhou, Fractional Evolution Equations and Inclusions: Analysis and Control. Academic Press, London (2016).10.1016/B978-0-12-804277-9.50002-XSuche in Google Scholar
[22] Y. Zhou, L. Peng, On the time-fractional Navier-Stokes equations. Comput. Math. Appl. 73, No 6 (2017), 874–891.10.1016/j.camwa.2016.03.026Suche in Google Scholar
[23] Y. Zhou, L. Peng, Weak solution of the time-fractional Navier-Stokes equations and optimal control. Comput. Math. Appl. 73, No 6 (2017), 1016–1027.10.1016/j.camwa.2016.07.007Suche in Google Scholar
[24] Y. Zhou, L. Zhang, Existence and multiplicity results of homoclinic solutions for fractional Hamiltonian systems. Comput. Math. Appl. 73, No 6 (2017), 1325–1345.10.1016/j.camwa.2016.04.041Suche in Google Scholar
[25] Y. Zhou, V. Vijayakumar and R. Murugesu, Controllability for fractional evolution inclusions without compactness. Evol. Equ. Control Theory4, No 1 (2015), 507–524.10.3934/eect.2015.4.507Suche in Google Scholar
© 2018 Diogenes Co., Sofia
Artikel in diesem Heft
- Frontmatter
- Editorial
- FCAA related news, events and books (FCAA–Volume 21–3–2018)
- Research Paper
- Hardy-Littlewood, Bessel-Riesz, and fractional integral operators in anisotropic Morrey and Campanato spaces
- Novel polarization index evaluation formula and fractional-order dynamics in electric motor insulation resistance
- The effect of the smoothness of fractional type operators over their commutators with Lipschitz symbols on weighted spaces
- Parallel algorithms for modelling two-dimensional non-equilibrium salt transfer processes on the base of fractional derivative model
- Some iterated fractional q-integrals and their applications
- Lebesgue regularity for nonlocal time-discrete equations with delays
- Multiple positive solutions for a boundary value problem with nonlinear nonlocal Riemann-Stieltjes integral boundary conditions
- Error estimates of high-order numerical methods for solving time fractional partial differential equations
- The Laplace transform induced by the deformed exponential function of two variables
- Attractivity for fractional evolution equations with almost sectorial operators
- The multiplicity solutions for nonlinear fractional differential equations of Riemann-Liouville type
- Well-posedness of general Caputo-type fractional differential equations
- Lyapunov-type inequalities for nonlinear fractional differential equation with Hilfer fractional derivative under multi-point boundary conditions
- Inverse source problem for a space-time fractional diffusion equation
- Erratum
- Erratum to: Invariant subspace method: A tool for solving fractional partial differential equations, in: FCAA-20-2-2017
Artikel in diesem Heft
- Frontmatter
- Editorial
- FCAA related news, events and books (FCAA–Volume 21–3–2018)
- Research Paper
- Hardy-Littlewood, Bessel-Riesz, and fractional integral operators in anisotropic Morrey and Campanato spaces
- Novel polarization index evaluation formula and fractional-order dynamics in electric motor insulation resistance
- The effect of the smoothness of fractional type operators over their commutators with Lipschitz symbols on weighted spaces
- Parallel algorithms for modelling two-dimensional non-equilibrium salt transfer processes on the base of fractional derivative model
- Some iterated fractional q-integrals and their applications
- Lebesgue regularity for nonlocal time-discrete equations with delays
- Multiple positive solutions for a boundary value problem with nonlinear nonlocal Riemann-Stieltjes integral boundary conditions
- Error estimates of high-order numerical methods for solving time fractional partial differential equations
- The Laplace transform induced by the deformed exponential function of two variables
- Attractivity for fractional evolution equations with almost sectorial operators
- The multiplicity solutions for nonlinear fractional differential equations of Riemann-Liouville type
- Well-posedness of general Caputo-type fractional differential equations
- Lyapunov-type inequalities for nonlinear fractional differential equation with Hilfer fractional derivative under multi-point boundary conditions
- Inverse source problem for a space-time fractional diffusion equation
- Erratum
- Erratum to: Invariant subspace method: A tool for solving fractional partial differential equations, in: FCAA-20-2-2017
