蒋萍萍

发布时间:2022-05-26 浏览次数:3921

 :

蒋萍萍

 

优秀青年学者(讲师)

 


 

研究方向

金融工程、实证金融

出生年月

199010

联系方式

ppjiang@suda.edu.cn

本部览秀楼303办公室

最后学历

博士

毕业学校

南开大学

 

 

Education

2016.09-2019.12, Nankai University, Ph.D. in Probability and Statistics

2017.09-2018.09, University of Illinois at Urbana-Champaign, Joint Ph.D.

 

Academic Experience

2022.04-Now, Soochow University, Lecturer

2020.01-2022.03, The Chinese University of Hong Kong, Shenzhen, Postdoc

2019.03-2019.10, Southern University of Science and Technology, Visiting Scholar

 

Research Interests

Derivatives Pricing, Stochastic Modeling, Quantitative Methods, Simulation

ESG/Sustainable Empirical Finance

 

Publications (*corresponding author)

[1] Zeng, P., Xu, Z., Jiang, P.*, Kwok, Y. Analytical solvability and exact simulation in models with affine  stochastic volatility  and Lévy jumps. Mathematical Finance, 2023, 33:842-890.

[2] Feng, R., Jiang, P.*, Volkmer, H. Geometric Brownian motion with affine drift and its time-integral. Applied Mathematics and Computation, 2021, 395, 125874.

[3] Zhang, H., Jiang, P*. On some properties of sticky Brownian motion. Stochastics and Dynamics, 2021, 21(06), 2150037.

[4] Feng, L., Jiang, P.*, Wang, Y. Constant elasticity of variance models with target zones. Physica A: Statistical Mechanics and its Applications, 2020, 537, 122702.

[5] Jiang, P.*, Li, B., Wang, Y. Exit times, undershoots and overshoots for reflected CIR process with two-sided jumps. Methodology and Computing in Applied Probability, 2020, 22, 693-710. 

 

Working Papers(*corresponding author)

[1] Feng, R., Jiang, P.*, Volkmer, H. Modeling financial market movement with winning and losing streaks: sticky extrema processes.      (Global Association of Risk Professionals (GARP) Best Paper Award for Quantitative Methods in Finance 2019)

[2] Feng, R., Jiang, P.*, Volkmer, H. Persistent of winning streaks: new perspective on momentum. Submitted.  

 

Teaching

Undergraduate: Stochastic Process, Econometrics

Graduate: Econometrics

Funds

[1] 中国博士后科学基金面上项目:粘性扩散过程的性质及其在金融衍生品定价中的应用研究(2020M671853)2020-2021,主持

[2] 国家自然科学基金(数理学部)重点项目:受控过程的随机动态规划(No.11631004)2017-2021,参与

[3] 国家自然科学基金(管理学部)重点项目:大数据驱动下的管理决策算法与模型(No.71532001)2016-2020,参与


 


 
地址:18新利体育 十梓街1号
版权所有 Copyright © 2012 18新利体育 金融工程研究中心. 访问次数: