常用链接
- [1] 109.Guoqiang Ren and Bin Liu ; Boundedness in a Chemotaxis System Under a Critical Parameter Condition, Bull etin of the Brazilian Mathematical Society, New Series, 2021, 52(5):281-289. .
- [2] 110.Guoqiang Ren and Bin Liu ; Boundedness of solutions for a quasilinear chemotaxis-haptotaxis model, Hokka ido Mathematical Journal, 2021, 50:207-245..
- [3] 111. Guoqiang Ren and Bin Liu ; Global classical solvability in a three-dimensional haptotaxis system modeling oncolytic virotherapy, Mathematical Methods in the Applied Science, 2021, 44:9275-9291. .
- [4] 112. Feng Dai and Bin Liu ; Optimal control problem for a general reaction–diffusion tumor–immune system with chemotherapy, Journal of the Franklin Institute , 2021, 358:448-473..
- [5] 113. Guoqiang Ren ad Bin Liu ; Large time behavior of solutions to a quasilinear attraction–repulsion chemotaxis model with nonlinear secretion, Journal of Mathematical Physics, 2021, 62:091510. .
- [6] 114. Feng Dai and Bin Liu ; Global Solvability and Optimal Control to a Haptotaxis Cancer Invasion Model with Two Cancer Cell Species, Applied Mathematics & Optimization, 2021, 84:2379-2443. .
- [7] 115. Guoqiang Ren and Bin Liu ; Global solvability and asymptotic behavior in a two-species chemotaxis system with Lotka–Volterra competitive kinetics, Mathematical Models and Methods in Applied Sciences, 2021, 31(5):941-978. .
- [8] 116. Feng Dai and Bin Liu ; Global solvability and asymptotic stabilization in a three-dimensional Keller–Segel–Navier–Stokes system with indirect signal production, Mathematical Models and Methods in Applied Sciences, 2021, 31(10):2091-2163. .
- [9] 101. B. Liu and Xin Wang, Linear Quadratic Nash Differential Games of Stochastic Singular Systems with Markovian Jumps, Acta Mathematica Vietnamica, 45(2020), 651-660..
- [10] 102. Linjie Ma and B. Liu, DYNAMIC ANALYSIS AND OPTIMAL CONTROL OF A FRACTIONAL ORDER SINGULAR LESLIE-GOWER PREY-PREDATOR MODEL, Acta Mathematica Scientia, 2020, 40B(5): 1525–1552..