葛斌部门：理学院

学科：数学

职务：

职称：副教授

指导
资格：博士生导师
硕士生导师
电话：**

传真：

邮箱：gebin791025@hrbeu.edu.cn

邮编：150001

地址：南通大街145号逸夫楼405
个人简介
葛斌，男，生于1979年10月，黑龙江富裕县人， 副教授，硕士、博士生指导教师，校青年骨干教师，黑龙江省数学学会理事，国家自然科学基金项目通讯评审和美国数学评论(MR)评论员。2010年毕业于哈尔滨工业大学数学系，获得理学博士学位。随后在哈尔滨工程大学自动化学院和俄亥俄州立大学数学系从事博士后研究工作。 研究兴趣为非线性分析，偏微分方程，微分包含。


教育经历
1998-2002 东北师范大学数学系数学与应用数学专业理学学士学位
2002-2005 吉林大学数学所基础数学专业理学硕士学位
2006-2010 哈尔滨工业大学数学系基础数学专业理学博士学位
2010-2013 哈尔滨工程大学控制科学与工程博士后
2013-2014 俄亥俄州立大学数学系博士后


工作经历
2005.07 - 至今 哈尔滨工程大学理学院数学系
研究方向
主要研究方向：
1、非线性泛函分析及其应用
2、椭圆型变指数偏微分方程多解性研究
4、分数阶偏微分方程多解性以及正则性
5、非线性动力系统

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热烈欢迎有志于从事相关领域学术研究的学生报考硕士和博士研究生 有意者请发个人简历至邮箱gebin791025@hrbeu.edu.cn联系.

承担项目
国家自然科学基金项目（青年基金）
国家自然科学基金项目（天元基金）
中国博士后基金面上项目
中国博士后基金特别资助项目
黑龙江省政府博士后科研启动基金项目
黑龙江省留学回国基金项目



学术交流
招生信息
招收博士研究生：2人/年
招收硕士研究生：3人/年

本科生授课课程
《实变函数》
《泛函分析》
《变分方法》

研究生授课课程
《泛函分析》
《非线性分析及其应用》
《变分原理》

实践性教学
教学研究课题
1、《问题驱动下的工科线性代数与解析几何课程教学的研究》，校教改项目、2014.4-2015.4.
2、《基于数学史文化的数学专业课的教学研究与实践》，校七育人项目、2017.6-2018.6.
社会兼职
黑龙江省数学会理事


专利成果



出版著作
专著：《变指数偏微分包含问题多解存在性》，科学出版社，2016年1月。

发表论文
[1] Wu Yu-Hu, Ge Bin, Olimpio H. Miyagaki, Existence results for the Klein-Gordon-Maxwell system in rotationally symmetric bounded domains. Zeitschrift für Analysis und ihre Anwendungen (ZAA). Accept. 2018
[2] Ge Bin, Sun Liang-liang, Cui Ying-Xin, Infinitely many solutions for a class of elliptic problems involving the fractional Laplacian. Rev. R. Acad. Cienc. Exactas Fís. Nat. Ser. A Math. RACSAM. Accept. 2018
[3] Shapour Heidarkhani, Shahin Moradi, Giuseppe Caristi, Ge Bin, Perturbed fourth-orded Kirchhoff type problems. Tbilisi Mathematical Journal. 11 (2018):113-143.
[4] Ge Bin, Cui Ying-Xin, Sun Liang-Liang, et al. The positive solutions to a quasi-linear problem of fractional p-Laplacian type without the Ambrosetti-Rabinowitz condition. Positivity. 22 (2018):873-895.
[5] Jia Li-Jiang, Ge Bin, Liu Li-Li, et al. A series of sequences convergent to Euler’s constant. Journal of Inequalities and Applications. 136 (2018):1-10.
[6] Hou Gang-Ling, Ge Bin, Lu Jian-Fang, Infinitely many solutions for sublinear fractional Schrodinger-type equations with general potentials.Electron. J. Differential Equations. 97 (2018):1-13.
[7] Ge Bin, Lu Jian-Fang, Zhao Ting-Ting, et al. Superlinear fractional boundary value problems without the Ambrosetti-Rabinowitz condition. Electron. J. Differential Equations. 85 (2018):1-13.
[8] Zhou Qing-Mei, Ge Bin, The fibering map approach to a nonlocal problem involving p(x)-Laplacian. Computers & Mathematics with Applications. 75 (2018):632-642.
[9] Ge Bin, Geng Chang, Nonhomogeneous eigenvalue problem with indefinite weight. Complex Variables and Elliptic Equations. 63 (2018): 266-277.
[10] Ge Bin, Zhou Qing-Mei, Multiple solutions for a Robin-type differential inclusion problem involving?the?p(x)-Laplacian. Mathematical Methods in the Applied Sciences. 40 (2017):6229-6238.
[11] Jia Li-Jiang, Ge Bin, Cui Ying-Xin, Sun Liang-Liang, Multiplicity solutions of a class fractional Schr?dinger equations. Open Math. 15 (2017):1010–1023.
[12] Ge Bin, Radulescu Viceniu D and Zhang Ji-Chun, Infinitely many positive solutions of fractional boundary value problems. Topological Methods in Nonlinear Analysis. 49(2017):647-664.
[11] Ge Bin, Cui Ying-Xin, Zhang Ji-Chun, Infinitely many positive solutions for fractional differential inclusions. Electron. J. Differential Equations. 198(2016):1-18.
[12] Ge Bin, Zhang Chao, On the superlinear problems involving the fractional Laplacian. Rev. R. Acad. Cienc. Exactas Fís. Nat. Ser. A Math. RACSAM. 110 (2016):343–355.
[13] Ge Bin, Existence theorem for Dirichlet problem for differential inclusion driven by the p(x)-Laplacian. Fixed Point Theory. 17 (2016):267–274.
[14] Ge Bin, Liu Li-Li, Infinitely many solutions for differential inclusion problems in RN involving the p(x)-Laplacian. Z. Angew. Math. Phys. 67 (2016):1-16
[15] Ge Bin, Multiple solutions of nonlinear Schr?dinger equation with the fractional Laplacian. Nonlinear Anal. Real World Appl. 30 (2016): 236–247.
[18] Hou Gang-Ling, Ge Bin, On superlinear fractional advection dispersion equation in RN. Bound. Value Probl. 109(2016):1-10.
[19] S. Heidarkhani, G.A. Afrouzi, S. Moradi, G. Caristi, B.Ge, Existence of one weak solution for p(x)-biharmonic equations with Navier boundary conditions. Z. Angew. Math. Phys. 67 (2016):1-13.
[20] Sun Dayang, Leung Victor, Qian Zhi-Hong, Liu Yan-Heng, Ge Bin, Beacon deployment strategy for guaranteed localization in wireless sensor networks. Wireless Networks. 22(2016): 1947-1959.
[21] Ge Bin, On an eigenvalue problem with variable exponents and sign-changing potential. Electron. J. Qual. Theory Differ. Equ. 92(2015):1-10.
[22] Ge Bin, Zhang Chao, Existence of positive solutions to elliptic problems involving the fractional Laplacian. Bound. Value Probl. 235(2015):1-12.
[23] Ge Bin, Zhang Chao, Existence of a positive solution to Kirchhoff problems involving the fractional Laplacian. Z. Anal. Anwend. 34 (2015): 419–434.
[24] Ge Bin, Zhou Qing-Mei, Wu Yu-Hu, Eigenvalues of the p(x)-biharmonic operator with indefinite weight. Z. Angew. Math. Phys. 66 (2015):1007–1021.
[25] Ge Bin, Zhou Qingmei, Zu Li, Positive solutions for nonlinear elliptic problems of p-Laplacian type on RN without (AR) condition. Nonlinear Anal. Real World Appl. 21 (2015): 99–109.
[26] Zu Li, Jiang Daqing, O'Regan Donal, Ge Bin, Periodic solution for a non-autonomous Lotka-Volterra predator-prey model with random perturbation. J. Math. Anal. Appl. 430 (2015):428–437.
[27] Zhang Chao, Zhou Shulin, Ge Bin, Gradient estimates for the p(x)-Laplacian equation in RN. Ann. Polon. Math. 114 (2015):45–65.
[28] S. Heidarkhani, Ge Bin, Critical Points Approaches to Elliptic Problems Driven by a p(x)-Laplacian. Ukrainian Mathematical Journal. 66(2015) :1883-1903.
[29] Ge Bin, Zhou, Qingmei, Existence and multiplicity of solutions for p(x)-Laplacian equations in RN. Electron. J. Differential Equations. 133(2014): 1-8.
[30] Ge Bin, On superlinear p(x)-Laplacian-like problem without Ambrosetti and Rabinowitz condition. Bull. Korean Math. Soc. 51(2014) :409–421.
[31] Ge, Bin, On the superlinear problems involving the p(x)-Laplacian and a non-local term without AR-condition. Nonlinear Anal. 102 (2014):133–143.
[32] Ge, Bin, Zhou Qing-Mei, Some Notes on M-hyponormal Weighted Shifts and Hyp onormalizable Weighted Shifts. Chinese Quarterly Journal of Mathematics. 3(2014) : 419-425.
[33] Ge, Bin, Sign changing solutions of the p(x)-Laplacian equation. Proc. Indian Acad. Sci. Math. Sci. 123 (2013): 515–524.
[34] Ge, Bin, Zhou Qingmei, Continuous spectrum of a fourth order nonhomogeneous differential operators with variable exponent. Electron. J. Qual. Theory Differ. Equ. 18( 2013);1-11.
[35] Ge Bin, Zhou Qing-Mei, Three solutions for a differential inclusion problem involving the p(x)-Kirchhoff-type, Applicable Analysis, 92(2013):60-71.
[36]Wu Yuhu, Ge Bin, A multiplicity result for the non-homogeneous Klein-Gordon-Maxwell system in rotationally symmetric bounded domains. J. Inequal. Appl. 583(2013):1-12.
[37] Zhou Qing-Mei, Ge Bin, Three Solutions for Inequalities Dirichlet Problem Driven by p(x)-Laplacian-Like. Abstract and Applied Analysis, 2013, 575328, 1-6.
[38] Ge Bin, Zhou Qing-Mei, Xue, Xiao-Ping, Multiplicity of solutions for differential inclusion problems in involving the p(x)-Laplacian, Zeitschrift fur Angewandte Mathematik und Physik, 63 (2012): 691-711.
[39] Ge Bin, Zhou Qing-Mei, Infinitely many positive solutions for a differential inclusion problem involving the p(x)-Laplacian, Mathematische Nachrichten, 285 (2012): 1303-1315.
[40] Ge Bin, Zhou Qing-Mei, Xue, Xiao-Ping, Multiplicity of solutions for differential inclusion problems in involving the p(x)-Laplacian, Monatshefte für Mathematik, 168 (2012): 363-380.
[41] Ge Bin, Shen Ji-Hong, Multiple Solutions for a Class of Differential Inclusion System Involving the (p(x),q(x))-Laplacian, Abstract and Applied Analysis, 2012, 971243, 1-17.
[42] Ge Bin, Zhou Qing-Mei, Multiple solutions to a class of inclusion problem with the p(x)-Laplacian, Applicable Analysis, 91(2012):895-909.
[43] Che Cheng-Fu, Ge Bin, Xue Xiao-Ping, Zhou Qing-Mei, W-0(1,p(x)) Versus C-1 Local Minimizers for Nonsmooth Functionals, Mathematical Modelling and Analysis, 17 (2012): 396-402.
[44] Ge Bin, Multiple Solutions for a Class of Fractional Boundary Value Problems, Abstract and Applied Analysis, 2012, 468980, 1-13.
[45] Ge Bin, Zhou Qing-Mei, Existence and multiplicity of solutions for a Neumann-type p(x)-Laplacian equation with nonsmooth potential, Electronic Journal of Qualitative Theory of Differential Equations, 17 (2011):1-12.
[46] Ge Bin, Xue Xiao-Ping, Zhou Qing-Mei, Existence of at least five solutions for a differential inclusion problem involving the p(x)-Laplacian, Nonlinear Analysis: Real World Applications, 12 (2011): 2304-2318 .
[47] Ge Bin, Xue Xiao-Ping, Zhou Qing-Mei,Existence of periodic solutions for a differential inclusion systems involving p(t)-Laplacian, Acta Mathematica Scientia, (31) 2011:1786-1802.
[48] Ge Bin, Xue Xiao-Ping, Zhou Qing-Mei, Multiple solutions for inequality Dirichlet problems by the p(x)-Laplacian, Nonlinear Analysis: Theory, Methods Applications, 73 (2010): 622- 633 .
[49] Ge Bin, Xue Xiao-Ping, Zhou Qing-Mei, Multiple solutions for inequality Dirichlet problems by the p(x)-Laplacian, Nonlinear Analysis: Real World Applications, 11 (2010):3198-3210.
[50] Ge Bin, Xue Xiao-Ping, Guo Meng-Shu, Three solutions to inequalities of Dirichlet problem driven by p(x)-Laplacian, Applied Mathematics and Mechanics, English Edition,31 (2010): 1283-1292.

荣誉

奖励



指导学生
博士研究生：
（2018--）
吕学晶--在读--


硕士研究生：

（2013-2016）
张继春--已毕业--北京景山学校曹妃甸分校宗盼盼--已毕业--哈尔滨工程大学出版社

（2014-2017）
孙亮亮，李清华--已毕业--哈尔滨市实验学校
刘丽丽--已毕业--北京中公教育科技股份有限公司黑龙江分公司

（2015-2018）
崔莹新--已毕业--天津大学应用数学中心读博
周一公--已毕业--航空弹药研究院
王鑫--已毕业--招商银行哈尔滨分行

（2016-2019）
耿畅---已毕业--成都飞机工业集团有限责任公司
赵婷婷---已毕业--河北深州中学

（2017-2020）
周康--在读--
路建芳--在读--
刑凯新--在读--

（2018-2021）
桂学霖--在读--
李林--在读--

徐子程--在读--


本科生毕业设计：

崔莹新（哈工程保研） （2015）
陆晟祺（2016）
罗来星，刘伟（2017）
桂学霖（哈工程保研），李克（2018）
王新宇（哈工大保研）（2019）

本科生学业导师：

刘冠章，查义杰 （2015-数学系）
冉益，王紫玲 （2016-数学系）
薛超，熊铮 （2017-陈赓班）




自定义模块2



自定义模块3