Hongjun Guo (郭宏骏)
Address: School of Mathematical Sciences,
217 Ningjing Lou,
Tongji University,
Shanghai
E-mail: guohj29@tongji.edu.cn
Short Vitae
- Researcher at Tongji University, since 2020
- Postdoctoral associate at University of Wyoming, 2019-2020
- Postdoctoral associate at University of Miami, 2018-2019
- PhD, Aix-Marseille Université, France, 2018
- Master, Lanzhou University, China, 2015
- Bachelor, Lanzhou University, China, 2012
Research interest
- Reaction-diffusion equations
- Traveling waves, generalized transition waves, Propagation phenomena
- Mathematical biology
Publications
- (with H. Bao) Asymptotic speeds of spreading for the Lotka-Volterra system with strong competition in R^N, submitted.
- (with K. Wang) Some new bistable transition fronts with changing shape, arXiv.
- (with Y. Lyu and Z.C. Wang) On Traveling Fronts of Combustion Equations in Spatially Periodic Media, J. Dyn. Diff. Equations, to appear. (link)
- Pushed fronts of monostable reaction-diffusion-advection equations, J. Diff. Equations, 365 (2023), 127-162. (link)
- (with W.T. Li, R. Liu and Z.C. Wang) Curved fronts of bistable reaction-diffusion equations in spatially periodic media, Arch. Ration. Mech. Anal. 242 (2021), 1571–1627. (link).
- (with J. Forbey and R. Liu) Front propagation and blocking of reaction-diffusion systems in cylinders, Nonlinearity, 34 (2021), 6750-6722.(link)
- (with H. Monobe) V-shaped fronts around an obstacle, Math. Ann. 379 (2021), 661-689.(link)
- Transition fronts in unbounded domains with multiple branches, Calc. Var. Part. Differ. Equ. 59, 160 (2020).(link)
- (with F. Hamel and W.J. Sheng) On the mean speed of bistable transition fronts in unbounded domains, J. Math. Pures Appl. 136 (2020), 92-157.(link)
- (with Z.H. Bu and Z.C. Wang) Transition fronts of combustion reaction diffusion in R^N, J. Dyn. Diff. Equ. 31 (2019), 1987-2015.(link)
- Propagating speeds of bistable transition fronts in spatially periodic media, Calc. Var. Part. Differ. Equ. (2018) 57: 47.(link)
- (with W.J. Sheng) Transition fronts of time periodic bistable reaction-diffusion equations in R^N, J. Diff. Equations 265 (2018), 2191-2242.(link)
- (with F. Hamel) Monotonicity of bistable transition fronts in R^N, J. Elliptic Parabol. Equ. 2 (2016), 145-155.(link)