張國寶,男,漢族,中共黨員。現為77779193永利教授,博士研究生導師,美國《Math. Review》評論員和德國《Zentralblatt MATH》評論員。2004年6月畢業于77779193永利數學系,獲學士學位。2011年6月在蘭州大學獲得理學博士學位(導師為李萬同教授)。2011年7月到77779193永利工作。2012年10月-2015年10月在77779193永利數學博士後流動站做博士後(合作導師為馬如雲教授)。2018年4月-2019年3月在加拿大紐芬蘭紀念大學做博士後(合作導師為Xiao-Qiang Zhao教授)。
張國寶近年來主要從事微分方程和生物數學的研究工作,共撰寫和發表學術論文60餘篇,其中多篇論文發表在國際、國内權威雜志《Calc. Var. PDE》、《J. Differential Equations》、《Z. Angew. Math. Phys.》、《Discrete Contin. Dyn. Syst.》、《Discrete Contin. Dyn. Syst. Ser. B》、《Nonlinear Anal. RWA》、《Nonlinear Anal.》、《J. Math. Anal. Appl.》、《Eur. J. Appl. Math.》、《Commun. Nonlinear Sci. Numer. Simulat.》、《J. Comput. Appl. Math.》和《Sci. China Math.》上;主持國家自然科學基金4項、教育部博士點新教師基金1項、中國博士後科學基金面上一等1項、甘肅省自然科學基金3項和甘肅省高等學校青年博士基金1項;2016年和2018年兩次入選77779193永利“青年教師教學科研之星資助計劃”。
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A區1708室
E-mail: zhanggb2011@nwnu.edu.cn
科研項目:
[1] 2023.01-2026.12 主持國家自然科學基金地區科學基金項目,編号:12261081;
[2] 2021.04-2023.10 主持甘肅省自然科學基金一般項目,編号:21JR7RA121;
[3] 2021.05-2022.04 主持甘肅省高等學校青年博士基金項目,編号:2021QB-018;
[4] 2019.01-2022.12 主持國家自然科學基金地區科學基金項目,編号:11861056;
[5] 2018.07-2020.06 主持甘肅省自然科學基金一般項目, 編号:18JR3RA093;
[6] 2015.01-2017.12 主持國家自然科學基金青年科學基金項目,編号:11401478;
[7] 2014.07-2016.12 主持甘肅省自然科學基金一般項目,編号:145RJZA220;
[8] 2013.04-2014.10主持中國博士後科學基金面上項目一等,編号:2013M530435;
[9] 2013.01-2015.12 主持教育部博士點新教師基金,編号:20126203120006;
[10] 2013.01-2013.12 主持國家自然科學基金數學天元基金,編号:11226189;
[11] 2012.01-2014.12 主持77779193永利青年教師科研提升計劃一般項目,
編号:NWNU-LKQN-11-22。
獎勵和榮譽:
1、科研獎勵和榮譽
[1]2021年3月獲77779193永利“優秀研究生導師”稱号;
[2]2019年1月獲甘肅省自然科學一等獎,3/5;
[3] 2017年11月獲“甘肅省優秀碩士學位論文”指導教師稱号;
[4]2017年8月獲甘肅省高校科研優秀成果一等獎,3/8;
[5]2015年8月獲甘肅省高校自然科學二等獎,3/6;
[6] 2014年8月獲甘肅省高校科技進步一等獎,4/7;
[7] 2012年8月獲甘肅省高校科技進步一等獎,4/6。
2、教學獎勵和榮譽
[1]指導2017年高教社杯全國大學生數學建模競賽獲甘肅賽區本科組特等獎,全國二等獎;
[2]指導2019年高教社杯全國大學生數學建模競賽獲甘肅賽區本科組一等獎;
[3]指導2020年高教社杯全國大學生數學建模競賽獲甘肅賽區本科組一等獎;
[4]指導2021年高教社杯全國大學生數學建模競賽獲甘肅賽區本科組一等獎;
[5]指導2022年高教社杯全國大學生數學建模競賽獲甘肅賽區本科組一等獎;
[6]指導2023年高教社杯全國大學生數學建模競賽獲甘肅賽區本科組特等獎。
發表的部分學術論文:
[1] J. He, G.-B. Zhang*, T. Liu, Propagation dynamics of a mutualistic model of mistletoes and birds with nonlocal dispersal, Eur. J. Appl. Math. in press, 2024.
[2] Z.-J. Yang, G.-B. Zhang*, J. He, Traveling wavefronts for a discrete diffusive Lotka-Volterra competition system with nonlocal nonlinearities,E. J. Differential Equations 2024, accpeted.
[3] J. Dang,G.-B. Zhang*, G. Tian, Wave propagation for a discrete diffusive mosquito-borne epidemic model,Qual. Theory Dyn. Syst. (2024) 23:104.
[4] J. He, G.-B. Zhang*,Traveling waves for a sign-changing nonlocal evolution equation with delayed nonlocal response, Bull. Malays. Math. Sci. Soc.(2024) 47 : 42.
[5] M.-L. Wang,G.-B. Zhang*, P. He, Invasion traveling waves of a three species Lotka-Volterra competitive system with nonlocal dispersal, Commun. Nonlinear Sci. Numer. Simul. 132 (2024) 107939.
[6] X.-X. Yang, G.-B. Zhang*, Y.-C. Hao, Existence and stability of traveling wavefronts for a discrete diffusion system with nonlocal delay effects, Discrete Contin. Dyn. Syst. Ser. B 29 (2024) 1891-1922.
[7] X.-X. Yang, G.-B. Zhang*, G. Tian, The dynamics of traveling wavefronts for a model describing host tissue degradation by bacteria,Int. J. Biomath. 17 (2024) 2350031.
[8] T.-T. Du, G.-B. Zhang*, Y.-C. Hao, Y.-Q. Shu, Existence and stability of traveling wavefronts for a nonlocal delay Belousov-Zhabotinskii system, Appl. Anal.102 (2023) 4828-4850.
[9] G. Tian*, G.-B. Zhang, Propagation dynamics of a discrete diffusive equation with nonlocal delay, Math. Methods Appl. Sci. 46 (2023) 14072-14086.
[10] Y.-C. Hao, G.-B. Zhang*, J. He, Exponential stability of traveling wavefronts for a system modelling the geographic spread of black-legged tick Ixodes scapularis, Z. Angew. Math. Phys.(2023) 74 : 116.
[11] Z.-J. Yang, G.-B. Zhang*, J. He, Existence and stability of traveling wavefronts for a three species Lotka-Volterra competitive-cooperative system with nonlocal dispersal, Math. Methods Appl. Sci. 46 (2023) 13051-13073.
[12] Z.-J. Yang, G.-B. Zhang*, Speed selection for a Lotka-Volterra competitive system with local vs. nonlocal diffffusions, Qual. Theory Dyn. Syst. (2023) 22 : 43.
[13] X.-X. Yang, G.-B. Zhang*, Entire solutions for an inhomogeneous bistable discrete diffusive equation, Bull. Malays. Math. Sci. Soc.(2023) 46 : 54.
[14] Y.-C. Hao, G.-B. Zhang*, Global stability of bistable traveling wavefronts for a three-species Lotka-Volterra competition system with nonlocal dispersal, Int. J. Biomath. 16 (2023) 2250106.
[15] Y.-X. Hao, W.-T. Li*, G.-B. Zhang,Entire solutions ofLotka-Volterra strong competition systems with nonlocal dispersal,Z. Angew. Math. Phys.(2022) 73 : 245.
[16] Y.-C. Hao, G.-B. Zhang*, Stability of bistable traveling wavefronts for a nonlocal dispersal epidemic system, E. J. Differential Equations 2022 (2022) No. 49, 1-21.
[17] Y.-C. Hao, G.-B. Zhang*, The dynamics of traveling wavefronts for anonlocal delay competition system with local vs.nonlocal diffusions, Commun. Nonlinear Sci. Numer. Simul. 110 (2022) 106381.
[18] G. Tian, Z.-C. Wang*, G.-B. Zhang,Stability of traveling waves of the nonlocal Fisher–KPP equation,Nonlinear Anal.211 (2021) 112399.
[19] J. He, G.-B. Zhang*, The minimal speed of traveling wavefronts for a three-component competition system with nonlocal dispersal,Int. J. Biomath.14 (2021) 2150058.
[20] T. Liu, G.-B. Zhang*, Global stability of traveling wavesfor a spatially discrete diffusion system with time delay, Electron. Res. Arch.29 (2021) 2599-2618.
[21] Q. Zhang, G.-B. Zhang*,Front-like entire solutions for a Lotka-Volterra weak competition system with nonlocal dispersal,J. Dyn. Control Syst.27 (2021) 133-151.
[22] S. Su, G.-B. Zhang*, Global stability of traveling waves for delay reaction-diffusion systems without quasi-monotonicity, Electron. J. Differential Equations 2020 (2020) No.46, 1-18.
[23] T. Su, G.-B. Zhang*, Invasion traveling waves for a discrete diffusive ratio-dependent predator-prey model, Acta Math. Sci.Ser. B 40 (2020) 1459-1476.
[24] T. Su, G.-B. Zhang*, Global stability of non-monotone noncritical traveling waves for a discrete diffusion equation with a convolution type nonlinearity, Taiwanese J. Math. 24 (2020) 937-957.
[25] G.-B. Zhang*,Asymptotics and uniqueness of traveling wavefronts for a delayed model of theBelousov-Zhabotinsky reaction, Appl. Anal. 99 (2020) 1639-1660.
[26] G.-B. Zhang,X.-Q. Zhao*, Propagation phenomena for a two-speciesLotka-Volterra strong competition system with nonlocal dispersal,Calc. Var. Partial Differential Equations(2020) 59 :10.
[27]G.-B. Zhang*,X.-Q. Zhao, Propagation dynamics of a nonlocal dispersalFisher-KPP equationin a time-periodic shifting habitat, J. Differential Equations268 (2020) 2852-2885.
[28] F.-D. Dong, W.-T. Li*, G.-B. Zhang, Invasion traveling wave solutions of a predator-prey modelwith nonlocal dispersal, Commun. Nonlinear Sci. Numer. Simulat.79 (2019) 104926, 1-17.
[29]G.-B. Zhang*,Global stability of non-monotone traveling wave solutions for a nonlocal dispersal equationwith time delay, J. Math. Anal. Appl.475 (2019) 605-627.
[30] G.-B. Zhang*, F.-D. Dong, W.-T. Li, Uniqueness and stability of traveling waves for a three-species competition system with nonlocal dispersal, Discrete Contin. Dyn. Syst. Ser. B 24 (2019) 1511-1541.
[31] Z.-X. Yang, G.-B. Zhang*,Stability of non-monotone traveling waves for a discrete diffusion equation with monostable convolution type nonlinearity, Sci. China Math. 61 (2018) 1789-1806.
[32]Z.-X. Yang, G.-B. Zhang*, Global stability of traveling wavefronts for nonlocal reaction-diffusion equations with time delay, Acta Math. Sci.Ser. B 38 (2018) 289-302.
[33] G.-B. Zhang, Y. Li, Z.S. Feng*, Exponential stability of traveling waves in a nonlocal dispersal epidemic model with delay, J. Comput. Appl. Math.344 (2018) 47-72.
[34] T. Su, G.-B. Zhang*, Stability of traveling wavefronts for a three-component Lotka-Volterra competition system on a lattice, Electron. J. Differential Equations2018 (2018), No.57, 1-16.
[35] G.-B. Zhang*, R. Ma, X.-S. Li, Traveling waves of a Lotka-Volterra strong competition system with nonlocal dispersal,Discrete Contin. Dyn. Syst. Ser. B 23 (2018) 587-608.
[36] G.-B. Zhang*, G. Tian, Stability of traveling wavefronts for a two-component lattice dynamical system arising in competition models, Canad. Math. Bull.61 (2018) 423-437.
[37] Z.-X. Yang, G.-B. Zhang*, G. Tian, Z.-S. Feng, Stability of non-monotone non-critical traveling waves in disctete reaction-diffusion equations with time delay, Discrete Contin. Dyn. Syst. Ser. S10 (2017) 581-603.
[38] Y. Li, W.-T. Li*, G.-B. Zhang, Stability and uniqueness of traveling waves of a nonlocal dispersal SIR epidemic model, Dyn. Partial Differ. Equ.14 (2017) 87-123.
[39] G.-B. Zhang*, R. Ma, Front-like entire solutions for delayed nonlocal dispersal equation with convolution type bistable nonlinearity,Rocky Mountain J. Math.47 (2017) 1355-1404.
[40] G. Tian, G.-B. Zhang*, Z.-X. Yang, Stability of non-monotone critical traveling waves for spatially discrete reaction-diffusion equations with time delay,Turkish J. Math.41 (2017) 655-680.
[41] G. Tian, G.-B. Zhang*, Stability of traveling wavefronts for a discrete diffusive Lotka-Volterra competition system, J. Math. Anal. Appl. 447 (2017) 222-242.
[42] G.-B. Zhang*, Non-monotone traveling waves and entire solutions for a delayed nonlocal dispersal equation, Appl. Anal. 96 (2017) 1830-1866.
[43] G.-B. Zhang*, R. Ma, Existence, uniqueness and stability of traveling wavefronts for a nonlocal dispersal equation with convolution type bistable nonlinearity,Electron. J. Differential Equations 2015 (2015), No. 144, 1-27.
[44] J.-B. Wang, W.-T. Li*, G.-B. Zhang, Spatial dynamics of a nonlocal dispersal vector disease model with spatio-temporal delay,Electron. J. Differential Equations2015 (2015), No.122, 1-28.
[45] W.-T. Li*, L. Zhang, G.-B. Zhang, Invasion entire solutions in a competition system with nonlocal dispersal, Discrete Contin. Dyn. Syst.35 (2015) 1531-1560.
[46] G.-B. Zhang*, R. Ma, Spreading speeds and traveling waves for anonlocal dispersal equation with convolution typecrossing-monostable nonlinearity, Z. Angew. Math. Phys.65 (2014),819-844.
[47] G.-B. Zhang, W.-T. Li*,Nonlinear stability of traveling wavefronts in an age-structured population modelwith nonlocal dispersal and delay,Z. Angew. Math. Phys.64 (2013), 1643-1659.
[48] G.-B. Zhang, W.-T. Li*, Z.-C. Wang, Spreading speeds and traveling waves for nonlocal dispersal equations with degenerate monostable nonlinearity, J. Differential Equations252 (2012) 5096-5124.
[49] G.-B. Zhang*, Global stability of traveling wave fronts for nonlocal delayed latticedifferential equations, Nonlinear Anal. Real World Appl.13 (2012) 1790-1801.
[50] G.-B. Zhang*, Global stability of wavefronts with minimal speeds for nonlocal dispersal equations with degenerate nonlinearity,Nonlinear Anal.74 (2011) 6518-6529.
[51] G.-B. Zhang*, Traveling waves in a nonlocal dispersal population model with age-structure, Nonlinear Anal.74 (2011) 5030-5047.
[52] G.-B. Zhang*, W.-T. Li, Y.-J. Sun, Asymptotic behavior for nonlocal dispersal equations, Nonlinear Anal.72 (2010) 4466-4474.
[53] G.-B. Zhang, W.-T. Li*, G. Lin, Traveling waves in delayed predator-prey systems with nonlocal diffusion and stage structure, Math. Comput. Model.49 (2009) 1021-1029.
