BaiYu Liu
2020.07-present: Professor, School of Mathematics and Physics, University of Science and Technology Beijing (USTB), China; 2015. 07-2020. 06: Associate professor, School of Mathematics and Physics, University of Science and Technology Beijing (USTB), China; 2010. 7-2015. 06: Lecturer, School of Mathematics and Physics, University of Science and Technology Beijing (USTB), China; 2005. 9-2010. 07: PhD, Department of Mathematical Sciences, Tsinghua University, China; 2001.9-2005.7:B.Sc, Department of Mathematics, East China Normal University, China;
[1] Xiaoliang LI, Baiyu LIU, Finite time blow-up and global solutions for a nonlocal parabolic equation with Hartree type, Comm. Pure. Appl.Anal., 19(2020)3093-3112. (SCI,3区,1.105) [2] Yonggang CHEN, Baiyu LIU, Symmetry and non-existence of positive solutions for fractional p-Laplacian systems, Nonlinear Analysis, TMA, 183(2019)303-322. (SCI, 2区, 1.45) [3] Xiaoliang LI, Baiyu LIU, Finite time blow-up and global existence for the non-local complex Ginzburg–Landau equation, J. Math. Anal. Appl, 466(1)(2018)961-985. (SCI, 2区, 1.188) [4] Baiyu LIU, Direct method of moving planes for logarithmic Laplacian system inbounded domains, Discrete & Continuous Dynamical Systems-A 38 (10)(2018)5339-5349. (SCI, 2区, 1.142) [5] Xiaoliang LI, Baiyu LIU, Vacuum isolating, blow up threshold, and asymptotic behavior of solutions for a nonlocal parabolic equation, J. Math. Phys., 2017, 58, 101503 (SCI, 4区, 1.077) [6] Baiyu LIU, Li MA, Radial symmetry results for fractional Laplaciansystems, Nonlinear Analysis: Theory, Methods & Applications,201, 146(2016)120~135 (SCI, 2区, 1.125) [7] Baiyu LIU, Li MA, Jing Wang, Blow up threshold for the Gross-Pitaevskii system with trapped dipolar quantum gases, Zeitschrift fur Angewandte Mathematik und Mechanik, 96(3)(2016)344~360(SCI, 3区, 1.293) [8] Baiyu LIU, Li MA, Blow up threshold for a parabolic type equation involving space integral and variational structure, Commun. Pur. Appl. Anal., 14(6)(2015)2169~2183(SCI, 3区, 0.926) [9] Baiyu LIU, Xinhui SI, Invariant sets and the blow up threshold for coupled systems of reaction-diffusion, Applicable Analysis: An International Journal, 94(4)(2015)637-652 (SCI, 4区, 0.648) [10] Baiyu LIU, Li MA, Blow up threshold for the Gross-Pitaevskii system with combined nonlocal nonlinearities, Journal of Mathematical Analysis and Applications, 425(2)(2015.05)1214-1224 (SCI, 2区, 1.233) [11] 赵金虎, 刘白羽, 徐尔, 一类完全非线性椭圆型方程组解的对称性, 数学物理学报, 35(2)(2015.04)312-323 (核心期刊) [12] Baiyu LIU, Li MA, Invariant sets and the blow up threshold for a nonlocal equation of parabolic type,Nonlinear Analysis-Theory Methods & Application,110(2014.11)141-156 (SCI, 2区,1.327) [13] Xinhui SI, Lin LI, Liancun ZHENG, Xinxin ZHANG, Baiyu LIU, The exterior unsteady viscous flow and heat transfer due to a porous expanding stretching cylinder, Computers & Fluids, 105(2014.12)280-284.(SCI,3区, 1.619) [14] Baiyu LIU, Li MA, Symmetry results for elliptic Schrödinger systems on half spaces, Journal of Mathematical Analysis and Applications, 401(1)(2013.05) 259-268 (SCI,2区,1.05) [15] Yanwu YANG, Jie ZHANG, Rui QIN, Juanjuan LI, Baiyu LIU, Zhong LIU, Budget strategy in uncertain environments of search auctions: a preliminary investigation, IEEE Transactions on Services Computing, VOL. 6, NO. 2, (2013.04-06) (SCI, 2区,1.985) [16] Baiyu LIU, Li MA, Symmetry results for decay solutions of semilinear elliptic systems on half spaces, Nonlinear Analysis-Theory Methods & Applications,75(2012.04)3167-3177 (SCI,1区,1.536) [17] Li MA, Baiyu LIU, Symmetry results for decay solutions of elliptic systems in the whole space. Adv. Math.,225(2010)3052-3063 (SCI, 2区, 1.405) [18] Li MA, Baiyu LIU, Symmetry results for classical solutions of Monge-Ampere systems on bounded planar domains, J. Math. Anal. Appl., 369(2010)678-685. (SCI,2区,1.05) [19] Li MA, Baiyu LIU, Q-curvature flow with indefinite nonlinearity, C. R. Acad. Sci. Paris, Ser. I, 348(2010)403-406. (SCI, 4区, 0.446) [20] Li MA, Baiyu LIU, Convex eigenfunction of a drifting Laplacian operator and the fundamental gap, Pacific J. Math., 240(2009)343-361.(SCI, 4区, 0.656) [21] Li MA, Baiyu LIU, Convexity of first eigenfunction of drifting Laplacian operator and its application, New York J. Math., 14(2008)393-401.