研究论文(Indexed by MathSciNet)

◆ Hong,Wenming and Wu Rong(1998), On the intersection problem of OU-type processes with continuous trajectory(in Chinese), Journal of Engineering Mathematics, Vol.15, No.2, 15-22.

◆ Hong, Wenming(1998), Cential limit theorem for the occupation time of catalytic super-Brownian motion. Chinese Science Bulletin, Vol.43, No.24, 2035-2040.  

◆ Hong, Wenming(1999), The occupation density field for the catalytic super-Brownian motion, Chinese Annals of Mathematics(Ser.B), Vol.20 No.4 , 447-454. 

◆ Wenming Hong and Zenghu Li(1999), A central limit theorem for the super-Brownian motion with super-Brownian immigration, Journal of Applied Probability, 36:4 (1999), 1218-1224.  

◆ Hong, Wenming(2000), Ergodic theorem for the two-dimensional super-Brownian motion with super-Brownian immigration, Progress in Nature Science, 10:2, 111-116. 

◆ Hong, Wenming and Wang, Zikun(2000), Immigration processes in catalytic medium, Science in China(Series A), Vol.43 No.1, 59-64. 

◆ Hong Wenming(2000), Super Ornstein-Uhlenbeck processes in catalytic medium, Advances in Mathematics(China), Vol.29, No.6, 490-498.

◆ Hong, Wenming and Zhong, Huifang(2001), On the support of the super-Brownian motion with super-Brownian immigration. Progress in Natural Science, Vol. 11 No.6, 468-475. 

◆ Wenming Hong and Zenghu Li(2001), Fluctuations of a super-Brownian motion with randomly controlled immigration. Statistics and Probability Letters, 51, 285-291. 

◆ Wenming Hong (2002), Longtime behavior for the occupation time processes of a super-Brownian motion with random immigration. Stochastic Process and their Applications, Vol.102 No.1 43-62.  

◆ Wenming Hong(2002),  Moderate deviation for the super-Brownian motion with super-Brownian immigration, Journal of Applied Probability, Vol.39 No.4 ,829-838. 

◆ Wenming Hong(2003), Limiting behavior of the super-Brownian motion with super-Brownian immigration, C.R.Math.Acad.Sci.Soc.R.Can.25(1),1-6.

◆ Hong, Wenming and Zhao, Xuelei(2003), Occupation time large deviations for the super-Brownian motion with random immigration, Chinese Annals of Mathematics (Ser.A). 24 (2),151--160; Chinese Journal of Contemporary Mathematics, 24(2), 119—130.

◆ Wenming Hong(2003), Large deviations for the super-Brownian motion with super-Brownian immigration, Journal of Theoretical Probability, Vol.16(4), 899-922. 

◆ Wenming Hong(2004)，A note on 2-level superprocesses, Journal of Applied Probability, Vol.41(1), 202-210.  

◆ Wenming Hong(2004)，Functional central limit theorem for super α-stable processes. Science in China Series A-Mathematics, Vol.47, No.6,  874-881.

◆ Wenming Hong(2005)，Quenched mean limit theorems for the super-Brownian motion with super-Brownian immigration, Infinite Dimensional Analysis,Quantum Probability and Related Topics, Vol.8, No.3, 383-396.  

◆ Wenming Hong and  Zenghu Li(2005)，Large and moderate deviations for occupation times of immigration superprocesses,  Infinite Dimensional Analysis,Quantum Probability and Related Topics, Vol. 8, No.4, 593-603. 

◆ Wenming Hong and Ofer Zeitouni (2007)  A quenched CLT for super-Brownian motion with random immigration,  Journal of Theoretical Probability, Vol.20, No.4, 807-820.

◆ Wenming Hong(2008)，Moderate deviations for the quenched mean of the super-Brownian motion with random immigration Science in China Series A-Mathematics, Vol. 51 (3): 343-350.

◆ Wenming Hong(2008)，Quenched large deviation for super-Brownian motion with random immigration. Infinite Dimensional Analysis,Quantum Probability and Related Topics, Vol.11, No.4, 627-637.

◆ Wang Shidong and Hong Wenming(2010)，Alternative Proof for the Recurrence and Transience of Random Walks in Random Environment with Bounded Jumps (in Chinese). Acta Mathematica Scientia, Vol 30A (2), 289-296.

◆ Wenming Hong and Huaming Wang(2010), Quenched moderate deviations principle for random walk in random environment, Science in China Series A-Mathematics,  Vol. 53 (8): 1947-1956

◆ Wenming Hong and Lin Zhang(2010), Branching structure for the transient (1;R)-random walk in random environment and its applications, Infinite Dimensional Analysis,Quantum Probability and Related Topics, Vol. 13, No. 4, 589–618.

 ◆ Wenming Hong and Huaming Wang(2013),  Intrinsic branching structure within (L-1) random walk in random environment and its applications, Infinite Dimensional Analysis,Quantum Probability and Related Topics, Vol. 16, No. 1，1350006 (14 pages).

◆ Wenming Hong and Hongyan Sun(2013), Renewal Theorem for $(L,1)$-Random Walk in Random Environment,  Acta Mathematica Scientia,  English Series, 33B(6):1736–1748.

◆ Wenming Hong and Huaming Wang(2014),   Intrinsic branching structure within random walk on $\mathbb{Z}$ ,  Theory  Probab. Appl. 58-4, pp. 640-659.

◆ Wenming Hong, Ke Zhou and Yiqiang Q. Zhao(2014), Explicit stationary distribution of the $(L,1)$-reflecting random walk on the half line, Acta Mathematica Sinica, English Series, 2014, 30(3): 371-388.

◆ Wenming Hong, Meijuan Zhang and Yiqiang Q. Zhao(2014),  Light-tailed behavior of stationary distribution for state-dependent random  walks on a strip, Frontiers of Mathematics in China, vol .9, no .4, 813-834.

◆ Wenming Hong, Hui Yang  and Ke Zhou(2015), Scaling limit of the local time of the Sinai's random walk ,  Frontiers of Mathematics in China, 10(6), pp 1313-1324.  arXiv:1403.2045.

◆ Wenming Hong and Meijuan Zhang(2016),  Branching structure for the transient random walk on a strip in a random environment,  Chinese Annals of Mathematics, 2016,37A(4):405-420. Chinese Journal of Contemporary Mathematics, 2016, Vol. 37, No. 4, pp. 347–362.

◆ Wenming Hong and Huaming Wang (2016) ,Branching Structures Within Random Walks and Their Applications. Branching Processes and Their Applications pp 57-73 . Lecture Notes in Statistics book series (LNS, volume 219), Springer International Publishing.

◆ Wenming Hong, Ke Zhou (2017),  A note on the passage time of  finite state  Markov chains, Communications in Statistics – Theory and Methods, Volume 46 (1), 438-445

◆ Wenming Hong, Hui Yang (2018), Scaling limit theorems for the $\kappa$-transient random walk in random and non-random environment, , arXiv:1412.4326，Front. Math. China 13 (2018), no. 5, 1033–1044.

◆ Wenming Hong, Yao Ji, Vladimia Vatutin (2018),Reduced critical Bellman-Harris branching processes for small populations, Discrete Mathematics and Applications, (2018) Volume 28, Issue 5 319-330.( 30,No 3, 25–39 (in Russian))

◆Wenming Hong, Minzhi Liu, Vladimia Vatutin (2019), Limit theorems for supercritical MBPRE with linear fractional offspring distributions , Markov Processes and Related Fields, 2019, v.25, Issue 1, 1-31

◆Wenming Hong,, Xiaoyue Zhang(2019), Asymptotic behaviour of heavy-tailed branching processes in random environments. Electronic Journal of Probability 2019, Vol. 24, paper no. 56, 1-17.

◆Wenming Hong, Minzhi Liu (2019), On the transience and recurrence for the Lamperti's random walk on the Galton-Watson trees , SCIENCE CHINA Mathematics, 62 (2019), no. 9, 1813–1822.

◆ Wenming Hong, Hui Yang (2019), Cutoff Phenomenon for Nearest Lamperti’s Random Walk, Methodology and Computing in Applied Probability, 21 (2019), no. 4, 1215–1228.

◆ 王华明, 张琳, 张美娟, 洪文明*(2019)，随机游动轨道中的分枝结构，中国科学: 数学，2019 年,第49 卷,第3 期, 517_534.

◆ Xiaoyue Zhang, Wanting Hou, Wenming Hong (2020), Limit theorems for the minimal position of a branching random walk in random environment. Markov Processes and Related Fields, 26, 839-860.

◆ Wanting Hou, Wenming Hong(2020), Minimal of independent time-inhomogeneous random walks, Infinite Dimensional Analysis,Quantum Probability and Related Topics,Vol. 23, No. 3 (2020). 2050021 (13 pages).

◆ 杨慧, 周珂, 侯婉婷, 洪文明*(2020), 两类带渐近扰动的随机过程的若干性质, 中国科学: 数学, 2020 年,第50 卷,第1 期, 179_196.

◆ Wanting Hou, Xiaoyue Zhang, Wenming Hong (2021),  Extremum of a time-inhomogeneous branching random walk. Front. Math. China 16 (2021),  no. 2, 459–478.

◆ Xiaoyue Zhang, Wenming Hong (2021), Fixed points of the smoothing transformation in random environment,  Front. Math. China, 2021, 16（4），1191-1210.

◆ Wenming Hong, Shengli Liang, Xiaoyue Zhang (2022), Conditional $L^{1}$-Convergence for the martingale of a critical branching process in random environment, Proceedings of the Steklov Mathematical Institute, Vol. 316, pp. 184–194.

◆Xiaoyue Zhang, Wenming Hong(2022), Quenched convergence rates for a supercritical branching process in a random environment, Statist. Probab. Lett.181(2022),Paper No. 109279, 8 pp..

◆ Wenming Hong, Dan Yao (2023), Conditional central limit theorem for subcritical branching random walk. ALEA Latin American Journal of Probability and Mathematical Statistics，20, 1411–1432 .

◆Lv, Y. and Hong, W. (2023), Quenched small deviation for the trajectory of a random walk with time-inhomogeneous random environment. Theory Probab. Appl., Volume 68, Issue 2, 322–343.

◆Lv, Y. and Hong, W. (2024), On the barrier problem of branching random walk  in time-inhomogeneous random environment, ALEA, Lat. Am.  J. Probab. Math. Stat. 21, 39–71 (2024).

◆ Wenming Hong, Shengli Liang (2024), Conditional central limit theorem for  critical branching random walk. submitted to ALEA Latin American Journal of Probability and  Mathematical Statistics. 555–574 (2024).

◆Wenming Hong, Mingyang Sun (2024), Berry-Esseen  theorem for random walks conditioned to stay positive. Electronic Communication of Probability 29 (2024), article no. 32, 1–8.

◆Wenming Hong, Mingyang Sun (2024+), Scaling limit of  the local time of random walks conditioned to stay positive. Journal of Applied Probability.  to appear.  

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