伏升茂老師簡介

伏升茂，男，漢族，1966年生于甘肅秦安。1988年本科畢業于77779193永利數學系、1991年碩士研究生畢業于陝西師範大學數學系、2001年博士研究生畢業于蘭州大學數學系并獲博士學位（偏微分方程方向）。1991年在77779193永利參加工作至今，2003年至2005年期間在中山大學數學與計算科學學院博士後流動站工作。現任77779193永利二級教授、博士研究生指導教師（偏微分方程和生物數學方向）和教育博士研究生指導教師、中國生物數學學會常務理事，美國《Mathematical Reviews》評論員。

 主要研究方向為偏微分方程與生物數學，已發表論文100餘篇。2007年發表在《數學學報》的論文“三種群食物鍊交錯擴散模型的整體解”被選入《科技導報》2007年第25卷第3期：近期國内中文報刊重要科技文章篇目輯覽。2013年發表在《Nonlinear Analysis: RWA》上的論文“Global behavior of solutions in a Lotka-Volterra predator-prey model with prey-stage structure”被列入該雜志當年Top 5。 

主持完成4項國家自然科學基金課題、2項甘肅省自然科學基金課題、1項甘肅省屬高校基本科研業務費課題和2項甘肅省教委科研基金，參與完成6項國家自然科學基金課題。現主持和參與國家自然科學基金各1項。

承擔的主要課程有：《數學分析》《常微分方程》《實變函數論》；《廣義函數與Sobolev空間》《偏微分方程》《非線性橢圓型方程》《非線性抛物型方程》《演化方程逼近論》和《生物數學》等。

曾獲西北師範大學教學名師獎、77779193永利教學質量優秀教師獎和甘肅省普通高等學校青年教師成才獎等。 

聯系方式：

地 址： 甘肅省蘭州市安甯區安甯東路967号  郵編：730070       

辦公地點： 77779193永利緻勤樓C區307室                 

E-mail: fusm@nwnu.edu.cn

科研項目：

2002.04-2003.12：國家自然科學基金數學天元基金資助項目(10226029)，主持；

2006.10-2008.10：甘肅省自然科學基金資助項目(3ZS061-A25- 015), 主持；

2006.10-2008.12：甘肅省教委科研基金資助項目(0601-21)，主持；

2009.03-2010.12：甘肅省自然科學基金資助項目(096RJZA118)，主持；

2011.01-2013.12：國家自然科學基金地區科學基金項目(11061031)，主持；

2012.01-2014.12：甘肅省屬高校基本科研業務費，主持；

2014.01-2017.12：國家自然科學基金地區科學基金項目(11361055)，主持；

2018.01-2021.12：國家自然科學基金地區科學基金項目(11761063)，主持；

2022.01-2025.12：國家自然科學基金地區科學基金項目 (12161080)，主持

發表的部分學術論文:

[1] Shengmao Fu, Ruyun Ma, Existence of a global coexistence state for periodic competition diffusion systems. Nonlinear Analysis: TMA 1997, 28(7):1265-1271. (SCI, EI)

[2] Ruyun Ma, Jihui Zhang, Shengmao Fu, The method of lower and upper solutions for fourth-order two-point boundary value problems. J. Math. Anal. Appl., 1997, 215(2):  415-422. (SCI)

[3] Shengmao Fu, Shangbin Cui, Persistence in a periodic competitor-competitor-mutualist diffusion system, J. Math. Anal. Appl., 2001, 263(1):234-245.(SCI)

[5] Shengmao Fu, Shangbin Cui, Quasisolutions and dynamics of time-periodic nonquasi- monotone reaction-diffusion systems, J. Math. Anal. Appl., 2006, 315(1): 349-358. (SCI)

[6] Shengmao Fu, Zijuan Wen, Shangbin Cui, Uniform boundedness and stability of global solutions in a strongly coupled three-species cooperating model, Nonlinear Analysis: RWA , 2008, 9(2): 272-289. (二區SCI, EI, IF₂₀₀₈=1.778)

[7] Fang Yang, Shengmao Fu, Global solution for a tritrophic food chain model with diffusion, Rocky Mountain J. Math. 2008, 38(5): 1785-1812. (ISTP, SCI)

[8] Shengmao Fu, Shangbin Cui, Global existence and stability of solution of a reaction-diffusion model for cancer invasion, Nonlinear Analysis: RWA, 2009，10(3): 1362-1369. (SCIE一區IF₂₀₀₉=2.381)

[9] Zijuan Wen, Shengmao Fu, Global solutions to a class of multi-species reaction-diffusion systems with cross-diffusions arising in population dynamics, Journal of Computational and Applied Mathematics 230 (2009) 34–43. (SCI 1.048)

[10] Huaihuo Cao, Libin Liu, Yong Zhang, Shengmao Fu, A fourth-order method of the convection-diffusion equations with Neumann boundary conditions. Appl. Math. Comput. 2011, 217 (22): 9133–9141. (SCI1.124)

[11] Lina Zhang, Shengmao Fu, Ping Hu, Effect of cross diffusion in a competition model with stage structure, International Journal of Biomathematics, Vol. 5, No. 6 (November 2012) 1250052 (18 pages). (SCIE)

[12] Shengmao Fu, Lina Zhang, Ping Hu, Global behavior of solutions in a Lotka-Volterra    predator-prey model with prey-stage structure, Nonlinear Analysis: RWA, vol. 14, no. 5, pp.  2027–2045, 2013. (一區SCIE, IF₂₀₁₃=2.201)被列入該雜志Most popular articles in 2013，入選Top 5

[13] Shengmao Fu, Yujuan Jiao, Zhongwei Tang, Multi-bump bound states for a nonlinear Schrödinger system with electromagnetic fields. Journal of Mathematical Analysis and Applications, vol. 404, no. 2, pp. 239–259, 2013. (SCI, IF₂₀₁₃=1.05)

[14] Shengmao Fu, Ji Liu, Spatial pattern formation in the Keller-Segel model with a logistic source, Computers and Mathematics with Applications, vol. 66, no. 3, pp. 403–417, 2013. (SCI, IF₂₀₁₃=2.069)

[15] Shengmao Fu, Yujuan Jiao, Least energy solutions for a non-linear Schrödinger system with electromagnetic fields and potential wells，Applicable Analysis, 2014，Vol. 93, No. 1, 137-152, http://dx.doi.org/10.1080/00036811.2012.762089 (SCIE)

[16] Xiaojuan Li, Shengmao Fu, Global stability of the virus dynamics model with intracellular delay and Crowley-Martin functional response.Mathematical Methods in the Applied Sciences,37 (2014), no. 10, 1405–1411.  (SCIE, IF₂₀₁₃=0.778)

[17] Xiaojuan Li, Shengmao Fu, Global stability of a virus dynamics model with intracellular delay and CTL immune response.Mathematical Methods in the Applied Sciences,38 (2015), no. 3, 420–430. DOI: 10.1002/mma.3078. (SCI)

[18] Liangliang Sun, Shengmao Fu, Wenjun Ma, Pattern formation in a predator–prey diffusion model with stage structure for the predator. Computers & Mathematics with Applications,70 (2015), no. 12, 2988–3000. (SCI)

[19] Shengmao Fu, Guangjian Huang, Badradeen Adam, Instability in a generalized multi-species Keller-Segel chemotaxis model, Computers & Mathematics with Applications, 72(9), 2280-2288, 2016. (SCI)

[20] Zijuan Wen, Shengmao Fu, Turing instability for a competitor-competitor-mutualist model with nonlinear cross-diffusion effects, Chaos, Solitons and Fractals 91 (2016) 379–385. (SCI)

[21] Kaigang Huang, Yongli Cai, Feng Rao, Shengmao Fu, Weiming Wang, Positive steady states of a density-dependent predator-prey model with diffusion, Discrete and Continuous Dynamical Systems Series B,23 (2018), no. 8, 3087-3107.  SCI，1531-3492

[22] Xiaoyan Gao, Yongli Cai, Feng Rao, Shengmao Fu, Weiming Wang, Positive steady states in an epidemic model with nonlinear incidence rate, Computers and Mathematics with Applications,Volume 75, Issue 2, 15 January 2018, Pages 424-443. SCI，0898-1221

[23] Yanfei Jia,Yongli Cai, Hongbo Shi, Shengmao Fu, Weiming Wang,Turing patterns in a reaction–diffusion epidemic model, International Journal of Biomathematics,Vol.11, No.2(2018)1850025(24pages). SCI,1793-5245.

[24] Haiyan Gao, Shengmao Fu, Hassan Mohammed, Existence of global solution to a two-species Keller-Segel chemotaxis model, International Journal of Biomathematics, Vol. 11, No. 2 (2018) 1850025 (24 pages) SCI

[25] Weiming Wang,  Xiaoyan Gao, Yongli Cai, Hongbo Shi,  Shengmao Fu,  Turing  patterns in a diffusive epidemic model with saturated infection force. Journal of the Franklin Institute 355 (2018) 7226–7245. SCI二區

[26] Lina Zhang, Shengmao Fu, Global bifurcation for a Holling-Tanner predator-prey model with prey-taxis, Nonlinear Analysis: Real World Applications47 (2019) 460-472.  二區SCI

[27] Wanjun Li, Xiaoyan Gao and Shengmao Fu, Temporal and spatial patterns in a diffusive ratio-dependent predator–prey system with linear stocking rate of prey species，Electronic Journal of Qualitative Theory of Differential Equations，2019, No. 80, 1–26. 1417-3875，SCI

[28] Huisen Zhang, Yongli Cai, Shengmao Fu, Weiming Wang, Impact of the fear effect in a prey-predator model incorporating a prey refuge, Applied Mathematics and Computation 356 (2019) 328–337. 一區SCI，高被引

[29] Jing Wang, Yongli Cai, Shengmao Fu, and Weiming Wang, The effect of the fear factor on the dynamics of a predator-prey model incorporating the prey refuge, Chaos 29, 083109 (2019) 10 pp.; https://doi.org/10.1063/1.5111121，SCI

[30] Ting Qiao, Yongli Cai, Shengmao Fu, Weiming Wang, Stability and Hopf Bifurcation in a Predator–Prey Model with the Cost of Anti-Predator Behaviors, International Journal of Bifurcation and Chaos, Vol. 29, No. 13 (2019) 1950185 (10 pages) (SCIE, IF₂₀₁₉=0.778)

[31] Xiaoyan Gao, Sadia Ishag, Shengmao Fu, Wanjun Li, Weiming Wang, Bifurcation and Turing pattern formation in a diffusive ratio-dependent predator-prey model with predator harvesting,

Nonlinear Analysis: Real World Applications 51 (2020) 102962, 28 pp. 二區SCI   1468-1218

[32] Shengmao Fu, Liangying Miao, Global existence and asymptotic stability in a predator–prey chemotaxis model，Nonlinear Analysis: Real World Applications 54 (2020) 103079，25pp.

 二區SCI，IF₂₀₁₉=2.072 1468-12189   

[33] Xinxin Li, Yongli Cai, Kai Wang, Shengmao Fu, Weiming Wang, Non-constant positive steady states of a host-parasite model with frequency- and density-dependent transmissions, Journal of the Franklin Institute 357 (2020) 4392–4413. 二區SCI，IF₂₀₁₉=4.036

[34] Xiaoli Hu，Shengmao Fu, Shangbing Ai, Global Asymptotic Behavior of Solutions for a Parabolic-Parabolic-ODE Chemotaxis System Modeling Multiple Sclerosis, Journal of Differential Equations, 269 (2020) 6875–6898. 二區SCI, IF₂₀₂₀ =1.938, 0022-0396

[35] Xiaoli Hu，Shengmao Fu, Global boundedness and stability for a chemotaxis model of Bol\'{o}'s concentric sclerosis, the special issue: "Mathematical Models and Autoimmune Diseases" the area: "Models of the role of chronic inflammation in autoimmunity", Mathematical Biosciences and Engineering, 17(5): 5134–5146. SCI. 1547-1063

[36]  Meijun Chen，Huaihuo Cao，Shengmao Fu，Stationary pattern of a predator-prey model with both prey-stage structure and prey-taxis，International Journal of Bifurcation and Chaos in Applied Sciences and Engineering Vol. 31, No. 3 (2021) 2150038 (18 pages) SCI二區IF₂₀₂₀ =2.145 0218-1274

[37] Shengmao Fu, Xue He, Lina Zhang, Zijuan Wen, Turing patterns and spatiotemporal patterns in a tritrophic food chain model with diffusion,Nonlinear Analysis: Real World Applications 59 (2021) 103260, 31pp. 二區SCI, EI, IF₂₀₁₉ =2.072，1468-1218

[38] Shengmao Fu, Huisen Zhang, Effect of hunting cooperation on the dynamic behavior for a diffusive Holling type II predator-prey model, Communications in Nonlinear Science and Numerical Simulation 99 (2021) 105807,23pp. 一區SCI，EI, IF2019 =3.487，1007-5704

[39] Liangying Miao, He Yang, Shengmao Fu, Global Boundedness in a Two-Species Predator-Prey Chemotaxis Model, Applied Mathematics Letters 111 (2021) 106639, 8pp. 一區SCI, EI, IF2019 =3.487，0893-9659

[40] Yang Yanhong, Fu Shengmao, Hopf bifurcation of a tumor immune model with time delay, Frontiers of Mathematics in China. Volume 17, Issue 2. 2022. PP 315-335. SCI

[41] Liangying Miao, Shengmao Fu, Global behavior of a two-species predator-prey chemotaxis model with signal-dependent diffusion and sensitivity, Discrete and Continuous Dynamical Systems Series B 28 (2023), no. 8, 4344-4365. SCI

[42] Meijun Chen, Shengmao Fu, Global boundedness and stabilization in a predator-prey model with cannibalism and prey-evasion,Electronic Journal of Qualitative Theory of Differential Equations，(2023), Paper No. 58, 23 pp. SCI

[43] Huisen Zhang, Shengmao Fu, Canyun Huang, Global solutions and pattern formations for a diffusive prey-predator system with hunting cooperation and prey-taxis, Discrete and Continuous Dynamical Systems Series B 29 (2024) http://dx.doi.org/10.3934/dcdsb.2024017, SCI

[44] 伏升茂, 高海燕, 崔尚斌, 帶自擴散和交錯擴散的三種群Lotka-Volterra競争模型解的一緻有界性和穩定性, 數學年刊，2006, 27A(3): 345-356.

[45] 伏升茂, 溫紫娟, 崔尚斌, 三種群食物鍊交錯擴散模型的整體解,數學學報,2007, 50A(1): 75-88.  (被選入《科技導報》2007年第25卷第3期“科技動态”欄目：近期國内中文報刊重要科技文章篇目輯覽)

[46] 伏升茂, 高海燕, 崔尚斌, 競争-競争-互惠交錯擴散模型的整體解，數學學報，2008，51(1): 153-163.

[47] 溫紫娟，伏升茂，三種群食物鍊交錯擴散模型古典解的整體存在性和收斂性，應用數學學報，2008，31(1): 152-163.

[48] 張麗娜，伏升茂，捕食者-食餌-互惠交錯擴散模型解的整體存在性，應用數學學報, 2011，34（1）：131-138.

[49] 張傑，伏升茂，崔尚斌，一個腫瘤侵入模型的定性分析， 應用數學學報, 2011，34（5）：786-800.

[50] 胡曉麗, 伏升茂, 帶Lotka-Volterra互惠源的多種群趨化模型的穩定性, 系統科學與數學,    37(6)：1541-1554, 2017.

[51] 楊豔紅, 伏升茂, 一類帶時滞的腫瘤免疫模型的Hopf分支, 數學進展,2021 50(3): 383-348. T3