杨婷 - 北京理工大学 - 数学与统计学院

个人简介

教育背景 2007.09—2012.06北京大学数学科学学院博士 2003.09—2007.06南开大学数学科学学院学士工作经历 2019— 北京理工大学数学与统计学院副教授 2017 University of Bath 博士后 2014—2019 北京理工大学数学与统计学院讲师 2012—2014 中科院数学与系统科学研究院应用数学所博士后

研究领域

主要从事概率论与随机过程方向的研究，包括分枝粒子系统与分枝过程、测度值马氏过程的极限理论和马氏过程的位势理论及其应用

近期论文

查看导师新发文章（温馨提示：请注意重名现象，建议点开原文通过作者单位确认）

Y.-X. Ren, T. Yang*, R. Zhang: Extremal process of super-Brownian motions: A probabilistic approach via skeletons. Preprint 2022. Y.-X. Ren, R. Song, T. Yang*: Spine decomposition and LlogL criterial for superprocesses with non-local branching mechanisms .ALEA, Lat. Am. J. Probab. Math. Stat. 19(1)(2022): 163–208 A. Kyprianou, V. Rivero, B. Sengul, T. Yang*: Entrance laws at the origin of self-similar Markov processes in high dimensions. Transactions of the American Mathematical Society. 373(9) (2020): 6227-6299. S. Palau, T. Yang*: Law of large numbers for supercritical superprocesses with non-local branching. Stochastic Processes and their Applications.130(2) (2020), 1074-1102. Z.-Q. Chen, Y.-X. Ren, T.Yang*: Skeleton decomposition and law of large numbers for supercritical superprocesses. Acta Applicandae Mathematicae, 159(1) (2019): 225-285. Z.-Q. Chen, T. Yang*: Dirichlet heat kernel estimates for fractional Laplacian under non-local perturbation. arXiv:1503.05302 [math.PR] Z.-Q. Chen, Y.-X. Ren, T. Yang*：Law of large numbers for branching symmetric Hunt processes with measure-valued branching rates. Journal of Theoretical Probability, 30(3) (2017): 898-931 Z.-Q. Chen, Y.-X. Ren, T. Yang*：Boundary Harnack principle and gradient estimates for harmonic functions with respect to fractional Laplacian perturbed by non-local operators. Potential Anal. 45(3)(2016), 509–537. Y.-X. Ren, T. Yang*, G.-H. Zhao: Conditional limit theorems for critical contituous-state branching processes. Sci. China Math. 57,12, (2014): 2577-2588. Y.-X. Ren, T. Yang*: Multitype branching Brownian motion and traveling waves. Adv. Appl. Probab. 46, 1, (2014), 217-240. Y.-X. Ren, T. Yang*: Limit theorem for derivative martingale at criticality w.r.t branching Brownian motion. Probab. Statistics Letters, 81(2) (2011), 195-200.