Controllability of fractional differential evolution equation of order $ \gamma \in (1, 2) $ with nonlocal conditions

This paper investigates the existence of positive mild solutions and controllability for fractional differential evolution equations of order $ \gamma \in (1, 2) $ with nonlocal conditions in Banach spaces. Our approach is based on Schauder's fixed point theorem, Krasnoselskii's fixed point theorem, and the Arzelà-Ascoli theorem. Finally, we include an example to verify our theoretical results.

[1]  Cheng Yang,et al.  HJB equation for optimal control system with random impulses , 2022, Optimization.

[2]  K. Nisar,et al.  Controllability discussion for fractional stochastic Volterra–Fredholm integro-differential systems of order 1 < r < 2 , 2022, International Journal of Nonlinear Sciences and Numerical Simulation.

[3]  K. Nisar,et al.  New discussion regarding approximate controllability for Sobolev-type fractional stochastic hemivariational inequalities of order r, 2022, Communications in Nonlinear Science and Numerical Simulation.

[4]  Urvashi Arora,et al.  A discussion on controllability of nonlocal fractional semilinear equations of order 1<r<2 with monotonic nonlinearity , 2022, Journal of King Saud University - Science.

[5]  K. Nisar,et al.  On the approximate controllability results for fractional integrodifferential systems of order 1<r, 2022, Journal of Computational and Applied Mathematics.

[6]  K. Shah,et al.  Qualitative Analysis of Implicit Dirichlet Boundary Value Problem for Caputo-Fabrizio Fractional Differential Equations , 2020 .

[7]  V. Vijayakumar,et al.  Results on the existence and controllability of fractional integro-differential system of order 1 < r < 2 via measure of noncompactness , 2020 .

[8]  X. Shu,et al.  Approximate controllability and existence of mild solutions for Riemann-Liouville fractional stochastic evolution equations with nonlocal conditions of order 1 < α < 2 , 2019, Fractional Calculus and Applied Analysis.

[9]  Jinde Cao,et al.  Hybrid Control Scheme for Projective Lag Synchronization of Riemann–Liouville Sense Fractional Order Memristive BAM NeuralNetworks with Mixed Delays , 2019, Mathematics.

[10]  T. Abdeljawad,et al.  On Riemann‐Liouville fractional q–difference equations and their application to retarded logistic type model , 2018 .

[11]  Mian Bahadur Zada,et al.  Fixed point theorems in b-metric spaces and their applications to non-linear fractional differential and integral equations , 2018 .

[12]  X. Shu,et al.  The existence of positive mild solutions for fractional differential evolution equations with nonlocal conditions of order 1 , 2015 .

[13]  Zhenhai Liu,et al.  Existence and controllability for fractional evolution inclusions of Clarke's subdifferential type , 2015, Appl. Math. Comput..

[14]  Yong Zhou Basic Theory of Fractional Differential Equations , 2014 .

[15]  S. Zorlu,et al.  Approximate controllability of fractional integro-differential equations involving nonlocal initial conditions , 2013 .

[16]  Krishnan Balachandran,et al.  Controllability results for damped second-order impulsive neutral integrodifferential systems with nonlocal conditions , 2013 .

[17]  Qianqian Wang,et al.  The existence and uniqueness of mild solutions for fractional differential equations with nonlocal conditions of order 1 , 2012, Comput. Math. Appl..

[18]  Yong Zhou,et al.  Existence and controllability results for fractional semilinear differential inclusions , 2011 .

[19]  Min Wang,et al.  Controllability of impulsive differential systems with nonlocal conditions , 2011, Appl. Math. Comput..

[20]  G. N’Guérékata,et al.  Existence of the mild solution for some fractional differential equations with nonlocal conditions , 2009 .

[21]  D. O'Regan,et al.  Existence and Controllability Results for First-and Second-Order Functional Semilinear Differential Inclusions with Nonlocal Conditions , 2007 .

[22]  K. Nisar,et al.  Results on controllability for Sobolev type fractional differential equations of order $ 1 < r < 2 $ with finite delay , 2022, AIMS Mathematics.