郑家愉 (Jiayu Zheng)

Contact Information:
● Postal address: Shenzhen MSU-BIT University, 1 International University Park Road, Longgang District, 518172 Shenzhen, Guangdong Province, P.R. China.
● Office: Room 303, Main Building.
● Email: jyzheng@smbu.edu.cn
Educational Background:
● 2014.09 - 2017.11, Ph.D. in Mathematics, Department of Mathematics, University of Macau. Supervisor: Prof. Jie Xiong.
● 2011.09-2014.07, M.S. in Mathematics, Department of Mathematics, University of Macau.
● 2007.09 - 2011.07, B.S. in Mathematics and Applied Mathematics, School of Mathematics, South China Normal University.
Working Experience:
● 2022.05 - Present, Lecturer, Department of Computational Mathematics and Control, Shenzhen MSU-BIT University.
● 2019.10 - 2021.10, Postdoctoral Fellow, Mathematical and Statistical Science, University of Alberta, Canada. Supervisor: Prof. Yaozhong Hu and Prof. Michael A. Kouritzin.
● 2018.11 - 2019.09, Associate Researcher, School of Mathematics, Sun-Yat Sen University.
● 2018.05 - 2018.10, Postdoctoral Fellow, Department of Mathematics, University of Macau.
● 2018.01 - 2018. 03, Research Associate, Department of Applied Mathematics, Hong Kong Polytechnic University.
Research Interests:
● Stochastic (partial) differential equations; Stochastic Filtering; Financial Mathematics.
Publications and Preprints:
[8] Y. Hu, X. Wang, P. Xia and J. Zheng (2023), Moment asymptotics for super-Brownian motions, arXiv:2303.12994, submitted.
[7] Y. Hu, M. A. Kouritzin, P. Xia and J. Zheng (2023), On mean-field super-Brownian motions, Annals of Applied Probability, Vol. 33, No. 5, 3872-3915.
[6] Y. Hu, M. A. Kouritzin and J. Zheng (2023), Nonlinear Mckean-Vlasov diffusions under the weak Hörmander condition with coefficients depending on quantiles, arXiv:2101.04080, Potential Analysis,accepted.
[5] J. Xiong Z. Xu and J. Zheng (2021), Mean-variance portfolio selection under partial information with drift uncertainty, Quantitative Finance, Vol. 21, No. 9, 1461-1473.
[4] J. Xiong, X. Zhou and J. Zheng (2019), Unique strong solutions of Levy processes drive stochastic differential equations with discontinuous coefficients, Stochastics, Vol. 91, No. 4, 592-612.
[3] H. Guo, J. Xiong and J. Zheng (2018), Stochastic maximum principle for generalized mean-field delay control problem, arXiv:1708.03622, submitted.
[2] J. Zheng and J. Xiong (2017), Pathwise uniqueness for stochastic differential equations driven by pure jump processes, Statistics and Probability Letters, 130, 100-104.
[1] D. Ding, Q. Meng and J. Zheng (2014), Efficient rainbow options pricing methods based on two-dimensional Fourier series expansions, Applied Mechanics and Materials, Vol. 444–445, 692–697.
Fundings:
● National Natural Science Foundation of China - Youth Fund (No.11901598), PI.
Talks:
● 2022.06 The 42th Conference on Stochastic Processes and their Applications, Wuhan, China, contributed talk;
● 2018.07 The 12th AIMS International Conference on Dynamical Systems and Differential Equations, Taipei, China;
● 2017.07 London Mathematical Society EPSRC Durham Symposium Stochastic Analysis, Durham University, England, invited talk;
● 2017.06 PIMS-CRM summer school in probability hold in the University of British Columbia, Vancouver Campus.
● 2016.11 The International Symposium on Probability Theory and Related Fields, Southern University of Science and Technology, Shenzhen, China, invited talk.