Dr. Zhibao Zheng
Postdoctoral Researcher, Alexander von Humboldt Fellow
Address
Appelstraße 11/11a
30167 Hannover
30167 Hannover
Building
Room
Dr. Zhibao Zheng
Postdoctoral Researcher, Alexander von Humboldt Fellow
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Research Interests
- Stochastic finite element method
- Random field simulation
- Reliability analysis
- Fractional calculus
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Academic experience and education
November 2021 – Present Postdoctoral research at IBNM, Leibniz University Hannover, Germany January 2020 – October 2021 Postdoctoral research at School of Civil Engineering, Harbin Institute of Technology, China August 2015 – December 2019 PhD candidate in Engineering Mechanics at Harbin Institute of Technology, China August 2011 – July 2015 Bachelor in Civil Engineering at Harbin Institute of Technology, China -
Honors and awards
Alexander von Humboldt Fellow, 2021 Outstanding Doctoral Dissertation Award, 2021
Title of dissertation: A new method for solving stochastic finite element equations and its applications, Harbin Institute of Technology
Outstanding Undergraduate Dissertation Award, 2015
Title of dissertation: A new fractional wavelet transform, Harbin Institute of Technology
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Journal publications
Zheng Z.B.*, Néron D., Nackenhorst U. (2024): A stochastic LATIN method for stochastic and parameterized elastoplastic analysis. In: Computer Methods in Applied Mechanics and Engineering, 419: 116613. Zheng Z.B.*, Beer M., Nackenhorst U. (2023): An iterative multi-fidelity scheme for simulating multi-dimensional non-Gaussian random fields. In: Mechanical Systems and Signal Processing, 200: 110643. Zheng Z.B.*, Nackenhorst U. (2023): Stochastic virtual element methods for uncertainty propagation of stochastic linear elasticity. Computational Mechanics, 1–18. Zheng Z.B.*, Valdebenito M., Beer M., Nackenhorst U. (2023): Simulation of random fields on random domains. In: Probabilistic Engineering Mechanics, 73: 103455. Zheng Z.B.*, Nackenhorst U. (2023): Semi-reduced order stochastic finite element methods for solving contact problems with uncertainties. In: Computational Mechanics, 72: 991–1008. Zheng Z.B.*, Nackenhorst U. (2023): A nonlinear stochastic finite element method for solving elastoplastic problems with uncertainties. In: International Journal for Numerical Methods in Engineering, 124(16): 3411-3435. Zheng Z.B.*, Valdebenito M., Beer M., Nackenhorst U. (2023): A stochastic finite element scheme for solving partial differential equations defined on random domains. In: Computer Methods in Applied Mechanics and Engineering, 405: 115860. Zheng Z.B.*, H.Z. Dai, Beer M. (2023): Efficient structural reliability analysis via a weak-intrusive stochastic finite element method. In: Probabilistic Engineering Mechanics. 2023, 71: 103414. Zheng Z.B.*, Beer M., Dai H.Z., Nackenhorst U. (2022): A weak-intrusive stochastic finite element method for stochastic structural dynamics analysis. In: Computer Methods in Applied Mechanics and Engineering, 399: 115360. Zheng Z.B.*, Beer M., Nackenhorst U. (2022): An efficient reduced-order method for stochastic eigenvalue analysis. In: International Journal for Numerical Methods in Engineering, 123(23): 5884-5906. Zheng, Z.B.*, Dai H.Z. (2021): Structural stochastic responses determination via a new stochastic finite element method. In: Computer Methods in Applied Mechanics and Engineering, 324: 113824. Zheng, Z.B.*, Dai H.Z., Wang Y.Y., Wang W. (2021): A sample-based iterative scheme for simulating non-stationary non-Gaussian stochastic processes. In: Mechanical Systems and Signal Processing, 151: 107420. Dai H.Z.*, Zheng, Z.B., Ma H.H. (2019): An explicit method for simulating non-Gaussian and non-stationary stochastic processes by Karhunen-Loève and polynomial chaos expansion. In: Mechanical Systems and Signal Processing, 115: 1-13. Zheng, Z.B., Zhao W., Dai H.Z.* (2019): A new definition of fractional derivative. In: International Journal of Non-Linear Mechanics, 108: 1-6. Zheng, Z.B., Dai H.Z.* (2018): A new fractional equivalent linearization method for nonlinear stochastic dynamic analysis. In: Nonlinear Dynamics, 91: 1075-1084. Zheng, Z.B., Dai H.Z.* (2017): Simulation of multi-dimensional random fields by Karhunen–Loève expansion. In: Computer Methods in Applied Mechanics and Engineering, 324: 221-247. Dai H.Z.*, Zheng, Z.B., Wang W. (2017): Nonlinear system stochastic response determination via fractional equivalent linearization and Karhunen-Loève expansion. In: Communications in Nonlinear Science and Numerical Simulation, 49: 145-158. Dai H.Z.*, Zheng, Z.B., Wang W. (2017): A new fractional wavelet transform. In: Communications in Nonlinear Science and Numerical Simulation, 44: 19-36. Dai H.Z.*, Zheng, Z.B., Wang W. (2017): On generalized fractional vibration equation. In: Chaos, Solitons & Fractals, 95: 48-51.
