[26]: X. Zhang*, Y. Pang, C. Ma, R. Yuan, Asymptotic behavior of stochastic susceptible-infectious-quarantined-susceptible epidemic model driven by Lévy noise, Journal of Mathematical Physics, 66 (2025) 042707.
[25]: Y. Chen, X. Zhang*, Positive recurrence of a stochastic heroin epidemic model with standard incidence and telegraph noise, Applied Mathematics Letters, 164 (2025) 109474.
[24]: X. Zhang*, Extinction, Ultimate Boundedness, and Persistence in the Mean of a Stochastic Heroin Epidemic Model With Distributed Delay, Mathematical Methods in the Applied Sciences, 48 (2025) 6592-6606.
[23]: C. Ma, X. Zhang*, R. Yuan, Dynamic analysis of a stochastic regime-switching Lotka-Volterra competitive system with distributed delays and Ornstein-Uhlenbeck process, Chaos, Solitons and Fractals, 190 (2025) 115765.
[22]: X. Zhang*, The stationary distribution of a stochastic heroin epidemic model with distributed delay, International Journal of Biomathematics, (2024) 2450077.
[21]: X. Zhang, Y. Zhang*, Ultimate boundedness of a stochastic chemostat model with periodic nutrient input and random disturbance, Acta Applicandae Mathematicae, 193 (2024) 6.
[20]: X. Zhang*, A Stochastic Non-autonomous Chemostat Model with Mean-reverting Ornstein–Uhlenbeck Process on the Washout Rate, Journal of Dynamics and Differential Equations, 36 (2024) 1819–1849.
[19]: X. Zhang*, S. Sun, Dynamical behavior of a classical stochastic delayed chemostat model, Journal of Mathematical Chemistry, 62 (2024) 1890–1911.
[18]: P. Li, X. Zhang*, R. Yuan, Asymptotic Behavior of a Stochastic Generalized Nutrient–Phytoplankton–Zooplankton Model, Journal of Nonlinear Science, 34 (2024) 94.
[17]: X. Zhang*, Geometric ergodicity and ultimate boundedness of a stochastic chemostat model with general nutrient uptake function, Applied Mathematics Letters, 150 (2024) 108939.
[16]: S. Ge*, R. Yuan, X. Zhang,Global existence, blow-up and dynamical behavior in a nonlocal parabolic problem with variational structure, Nonlinear Analysis: Real World Applications, 76 (2024) 104007.
[15]: X. Zhang*, Ultimate boundedness of a stochastic chemostat model with periodic nutrient input and discrete delay, Chaos, Solitons and Fractals, 175 (2023) 113956.
[14]: X. Zhang*, R. Yuan, The stochastic periodic behavior of a chemostat model with periodic nutrient input, Bulletin of the Malaysian Mathematical Sciences Society, 46 (2023) 165.
[13]: X. Zhang*, A note on the stationary probability density function and covariance matrix of a stochastic chemostat model with distributed delay, Qualitative Theory of Dynamical Systems, 22 (2023) 114.
[12]: X. Zhang*, R. Yuan, Stochastic bifurcation and density function analysis of a stochastic logistic equation with distributed delay and strong kernel, International Journal of Biomathematics, 16 (3) (2023) 2250085.
[11]: X. Zhang*, R. Yuan, Stochastic bifurcation and density function analysis of a stochastic logistic equation with distributed delay and weak kernel,Mathematics and Computers in Simulation, 195 (2022) 56-70.
[10]: X. Zhang*, R. Yuan, Forward attractor for stochastic chemostat model with multiplicative noise. Chaos Solitons Fractals 153 (2021) 111585.
[9]: X. Zhao, X. Zhang*, R. Yuan,The principal eigenvalue for a time-space periodic reaction-diffusion-advection equation with delay nutrient recycling,Chaos, Solitons and Fractals,150 (2021) 111134.
[8]: X. Zhang*, R. Yuan, A stochastic chemostat model with mean-reverting Ornstein-Uhlenbeck process and Monod-Haldane response function, Applied Mathematics and Computation, 394 (2021) 125833.
[7]: X. Zhang*, R. Yuan, Pullback attractor for random chemostat model driven by colored noise, Applied Mathematics Letters, 112 (2021) 106833.
[6]: X Zhang*, S. Sun, Dynamical Analysis of a Stochastic Delayed Two-Species Competition Chemostat Model, Bulletin of the Malaysian Mathematical Sciences Society, 43 (2020) 3725-3755.
[5]: X. Zhang*, R. Yuan, Stochastic properties of solution for a chemostat model with a distributed delay and random disturbance, International Journal of Biomathematics, 13 (2020) 2050066.
[4]: X. Zhang*, R. Yuan, Sufficient and necessary conditions for stochastic near-optimal controls: a stochastic chemostat model with non-zero cost inhibiting, Applied Mathematical Modelling, 78 (2020) 601-626.
[3]: X. Zhang*, R. Yuan, The existence of stationary distribution of a stochastic delayed chemostat model, Applied Mathematics Letters, 93 (2019) 15-21.
[2]: S. Sun*, X. Zhang, Asymptotic behavior of a stochastic delayed chemostat model with nutrient storage, Journal of Biological Systems, 26 (2018) 225-246.
[1]: S. Sun*, X. Zhang, Asymptotic behavior of a stochastic delayed chemostat model with nonmonotone uptake function, Physica A, 512 (2018) 38-56.