Regional analysis of time-fractional diffusion processes F Ge, YQ Chen, C Kou Springer International Publishing, 2018 | 76 | 2018 |
Stability analysis by Krasnoselskii’s fixed point theorem for nonlinear fractional differential equations F Ge, C Kou Applied Mathematics and Computation 257, 308-316, 2015 | 73 | 2015 |
Approximate controllability of semilinear evolution equations of fractional order with nonlocal and impulsive conditions via an approximating technique FD Ge, HC Zhou, CH Kou Applied Mathematics and Computation 275, 107-120, 2016 | 66 | 2016 |
Boundary feedback stabilisation for the time fractional‐order anomalous diffusion system F Ge, YQ Chen, C Kou IET Control Theory & Applications 10 (11), 1250-1257, 2016 | 57 | 2016 |
Mittag-Leffler convergent backstepping observers for coupled semilinear subdiffusion systems with spatially varying parameters F Ge, T Meurer, YQ Chen Systems & Control Letters 122, 86-92, 2018 | 40 | 2018 |
Regional controllability analysis of fractional diffusion equations with Riemann–Liouville time fractional derivatives F Ge, YQ Chen, C Kou Automatica 76, 193-199, 2017 | 40 | 2017 |
Event-triggered boundary feedback control for networked reaction-subdiffusion processes with input uncertainties F Ge, YQ Chen Information Sciences 476, 239-255, 2019 | 38 | 2019 |
Cyber-physical systems as general distributed parameter systems: three types of fractional order models and emerging research opportunities F Ge, YQ Chen, C Kou IEEE/CAA Journal of Automatica Sinica 2 (4), 353-357, 2015 | 35 | 2015 |
On the regional gradient observability of time fractional diffusion processes F Ge, YQ Chen, C Kou Automatica 74, 1-9, 2016 | 34 | 2016 |
On the regional controllability of the sub-diffusion process with Caputo fractional derivative F Ge, YQ Chen, C Kou, I Podlubny Fractional Calculus and Applied Analysis 19 (5), 1262-1281, 2016 | 28 | 2016 |
Observer-based event-triggered control for semilinear time-fractional diffusion systems with distributed feedback F Ge, YQ Chen Nonlinear Dynamics 99 (2), 1089-1101, 2020 | 26 | 2020 |
Actuator characterisations to achieve approximate controllability for a class of fractional sub-diffusion equations F Ge, YQ Chen, C Kou International Journal of Control 90 (6), 1212-1220, 2017 | 26 | 2017 |
Asymptotic stability of solutions of nonlinear fractional differential equations of order 1< α< 2 F Ge, C Kou Journal of Shanghai Normal University 44 (3), 284-290, 2015 | 26 | 2015 |
Regional gradient controllability of sub-diffusion processes F Ge, YQ Chen, C Kou Journal of Mathematical Analysis and Applications 440 (2), 865-884, 2016 | 22 | 2016 |
Regional output feedback stabilization of semilinear time-fractional diffusion systems in a parallelepipedon with control constraints F Ge, YQ Chen International Journal of Robust and Nonlinear Control 30, 3639–3652, 2020 | 21 | 2020 |
Optimal vaccination and treatment policies for regional approximate controllability of the time-fractional reaction–diffusion SIR epidemic systems F Ge, YQ Chen ISA Transactions 115, 143-152, 2021 | 18 | 2021 |
Existence of solutions for fractional differential equations with three-point boundary conditions at resonance in FD Ge, HC Zhou Electronic Journal of Qualitative Theory of Differential Equations 2014 (68 …, 2014 | 15 | 2014 |
Existence of solutions to fractional differential equations with multi-point boundary conditions at resonance in Hilbert spaces HC Zhou, FD Ge, CH Kou Texas State University, Department of Mathematics, 2016 | 14 | 2016 |
Existence of solutions for a coupled fractional differential equations with infinitely many points boundary conditions at resonance on an unbounded domain FD Ge, HC Zhou, CH Kou Differential Equations and Dynamical Systems 27, 395-411, 2019 | 13 | 2019 |
Regional boundary controllability of time fractional diffusion processes F Ge, YQ Chen, C Kou IMA Journal of Mathematical Control and Information 34 (3), 871-888, 2017 | 13 | 2017 |