| A hyperchaotic system without equilibrium Z Wang, S Cang, EO Ochola, Y Sun Nonlinear Dynamics 69, 531-537, 2012 | 184 | 2012 |
| The generation and circuit implementation of a new hyper-chaos based upon Lorenz system T Gao, G Chen, Z Chen, S Cang Physics Letters A 361 (1-2), 78-86, 2007 | 181 | 2007 |
| A four-wing hyper-chaotic attractor and transient chaos generated from a new 4-D quadratic autonomous system S Cang, G Qi, Z Chen Nonlinear Dynamics 59, 515-527, 2010 | 137 | 2010 |
| Hidden and self-excited coexisting attractors in a Lorenz-like system with two equilibrium points S Cang, Y Li, R Zhang, Z Wang Nonlinear Dynamics 95, 381-390, 2019 | 75 | 2019 |
| Four-dimensional autonomous dynamical systems with conservative flows: two-case study S Cang, A Wu, Z Wang, Z Chen Nonlinear Dynamics 89, 2495-2508, 2017 | 73 | 2017 |
| Chaotic behavior and circuit implementation of a fractional-order permanent magnet synchronous motor model W Xue, Y Li, S Cang, H Jia, Z Wang Journal of the franklin institute 352 (7), 2887-2898, 2015 | 63 | 2015 |
| Simplified hyper-chaotic systems generating multi-wing non-equilibrium attractors Z Wang, J Ma, S Cang, Z Wang, Z Chen Optik 127 (5), 2424-2431, 2016 | 54 | 2016 |
| Pseudo-random number generator based on a generalized conservative Sprott-A system S Cang, Z Kang, Z Wang Nonlinear Dynamics 104, 827-844, 2021 | 47 | 2021 |
| Hyperchaos in a conservative system with nonhyperbolic fixed points A Wu, S Cang, R Zhang, Z Wang, Z Chen Complexity 2018 (1), 9430637, 2018 | 44 | 2018 |
| Conservative chaos and invariant tori in the modified Sprott A system S Cang, Y Li, W Xue, Z Wang, Z Chen Nonlinear Dynamics 99, 1699-1708, 2020 | 43 | 2020 |
| Birth of one-to-four-wing chaotic attractors in a class of simplest three-dimensional continuous memristive systems S Cang, A Wu, Z Wang, W Xue, Z Chen Nonlinear Dynamics 83, 1987-2001, 2016 | 38 | 2016 |
| Generating multicluster conservative chaotic flows from a generalized Sprott-A system S Cang, Y Li, Z Kang, Z Wang Chaos, Solitons & Fractals 133, 109651, 2020 | 34 | 2020 |
| On a 3-D generalized Hamiltonian model with conservative and dissipative chaotic flows S Cang, A Wu, Z Wang, Z Chen Chaos, Solitons & Fractals 99, 45-51, 2017 | 33 | 2017 |
| Analysis and circuit implementation of a new four-dimensional non-autonomous hyper-chaotic system SJ Cang, ZQ Chen, ZZ Yuan | 32 | 2008 |
| Distinguishing Lorenz and Chen systems based upon Hamiltonian energy theory S Cang, A Wu, Z Wang, Z Chen International Journal of Bifurcation and Chaos 27 (02), 1750024, 2017 | 29 | 2017 |
| A generic method for constructing n-fold covers of 3D conservative chaotic systems S Cang, Y Li, Z Kang, Z Wang Chaos: An Interdisciplinary Journal of Nonlinear Science 30 (3), 2020 | 28 | 2020 |
| Conservative chaos in a class of nonconservative systems: Theoretical analysis and numerical demonstrations S Cang, A Wu, R Zhang, Z Wang, Z Chen International Journal of Bifurcation and Chaos 28 (07), 1850087, 2018 | 28 | 2018 |
| Analytical and numerical investigation of a new Lorenz-like chaotic attractor with compound structures S Cang, Z Wang, Z Chen, H Jia Nonlinear Dynamics 75, 745-760, 2014 | 26 | 2014 |
| Dynamical analysis and circuit implementation of a DC/DC single-stage boost converter with memristance load R Zhang, A Wu, S Zhang, Z Wang, S Cang Nonlinear Dynamics 93, 1741-1755, 2018 | 24 | 2018 |
| A general method for exploring three-dimensional chaotic attractors with complicated topological structure based on the two-dimensional local vector field around equilibriums S Cang, A Wu, Z Wang, Z Wang, Z Chen Nonlinear Dynamics 83, 1069-1078, 2016 | 23 | 2016 |
Zenghui WangProfessor, University of South AfricaPatvirtintas el. paštas unisa.ac.za