[1] Li, Jingyu; Zhang, Yong. An almost sure central limit theorem for the stochastic heat equation. Statistics & Probability Letters, 2021, 177: 1-8.
[2] Li, Jingyu; Zhang, Yong. Almost sure central limit theorems for stochastic wave equations. Electronic Communications in Probability, 2023, 28: 1-12.
[3] Li, Jingyu; Zhang, Yong. An almost sure central limit theorem for the parabolic Anderson model with delta initial condition. Stochastics: An International Journal of Probability and Stochastic Processes, 2023, 95(3): 483-500.
[4] Li, Jingyu; Zhang, Yong. The law of the iterated logarithm for spatial averages of the stochastic heat equation. Acta Mathematica Scientia (Series B), 2023, 43(2): 907-918.
[5] Bai, Yansong; Zhang, Yong; Li, Jingyu. Moderate deviation principle for the determinant of sample correlation matrix. Stat, 2024, 13(4): 1-10.
[6] Li, Jingyu; Zhang, Yong. A general form for precise asymptotics for the stochastic wave equation. Filomat, 2024, 38(18): 6395–6411.
[7] Li, Jingyu; Zhang, Yong; Zhang, Wanying; Bai, Yansong. Almost sure central limit theorems for the parabolic Anderson model with Neumann/Dirichlet/periodic boundary conditions. Lithuanian Mathematical Journal, 2024, 64(3): 332-340.
[8] Zhang, Wanying; Zhang, Yong; Li, Jingyu. Convergence of densities of spatial averages of the linear stochastic heat equation. Filomat, 2024, 38(28): 9813–9833.
[9] Li, Jingyu; Guo, Shuang; Zhang, Wanying; Zhang, Yong. On the precise asymptotics for the stochastic heat and wave equations. Journal of Mathematical Physics, 2025, 66: 1-13.
[10] Li, Jingyu; Zhang, Yong. General results on precise asymptotics for the stochastic heat equation. Communications in Statistics - Theory and Methods, 2025, 54(5): 1354-1369.
[11] Zhang, Wanying; Zhang, Yong; Li, Jingyu. Functional central limit theorems for spatial averages of the parabolic Anderson model with delta initial condition in dimension d≥1. Lithuanian Mathematical Journal, 2025, 65(4): 608–642.
