陈思彤

特聘副教授硕士生导师

入职时间：2019-07-01

所在单位：数学与统计学院

学历：博士研究生毕业

办公地点：数学院664办公室

性别：女

学位：博士学位

在职信息：在职

毕业院校：中南大学

学科：数学

曾获荣誉：

2021-11-01 当选： 2021年湖南省优秀博士论文

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论文成果

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[1]Chen Sitong, Tang Xianhua, Another look at Schrodinger equations with prescribed mass.Journal of Differential Equations, 2024, 386: 435–479.
[2]Chen, Sitong, Radulescu, Vicentiu D., Tang, Xianhua, Yuan, Shuai.Normalized Solutions for Schrodinger Equations with Critical Exponential Growth in R^2.SIAM Journal on Mathematical Analysis, 55 (6) : 7704-7740.
[3]Chen, Sitong, Tang, Xianhua, Normalized solutions for Schrodinger equations with mixed dispersion and critical exponential growth in R2.Calculus of Variations and Partial Differential Equations, 2023, 62 (9) : No.261.
[4]Chen, Sitong, Vicentiu D. Radulescu, Tang, Xianhua, Wen, Lixi, Planar Kirchhoff equations with critical exponential growth and trapping potential.Mathematische Zeitschrift, 2022, 302 (2) : 1061-1089.
[5]Chen, Sitong, Tang, Xianhua, On the planar Schrodinger equation with indefinite linear part and critical growth nonlinearity.Calculus Of Variations And Partial Differential Equations, 2021
[6]Chen, Sitong, Shu, Muhua, Tang, Xianhua, Wen, Lixi, Planar Schrodinger-Poisson system with critical exponential growth in the zero mass case.Journal Of Differential Equations, 2022: 448-480.
[7]Chen, Sitong, Tang, Xianhua, Axially symmetric solutions for the planar Schrodinger-Poisson system with critical exponential growth.Journal Of Differential Equations, 2020: 9144-9174.
[8]Chen, Sitong, Tang, Xianhua, On the planar Schrodinger-Poisson system with the axially symmetric potential.Journal Of Differential Equations, 2020: 945-976.
[9]Chen, Sitong, Fiscella, Alessio, Pucci, Patrizia, Tang, Xianhua, Semiclassical ground state solutions for critical Schrodinger-Poisson systems with lower perturbations.Journal Of Differential Equations, 2020: 2672-2716.
[10]Chen, Sitong, Radulescu, Vicentiu D., Tang, Xianhua, Zhang, Binlin, Ground state solutions for quasilinear Schrodinger equations with variable potential and superlinear reaction.Revista Matematica Iberoamericana, 2020: 1549-1570.
[11]Tang, Xianhua, Chen, Sitong, Ground state solutions of Nehari-Pohozaev type for Kirchhoff-type problems with general potentials.Calculus Of Variations And Partial Differential Equations, 2017
[12]Tang, Xianhua, Chen, Sitong, Lin, Xiaoyan, Yu, Jianshe, Ground state solutions of Nehari-Pankov type for Schrodinger equations with local super-quadratic conditions.Journal Of Differential Equations, 2020: 4663-4690.
[13]Chen, Sitong, Lin, Radulescu, Vicentiu D., Tang, Xianhua, Ground state solutions of the non-autonomous Schrodinger-Bopp-Podolsky system.Analysis And Mathematical Physics, 2022
[14]Yuan, Shuai, Chen, Sitong, Symmetric ground state solutions for the Choquard Logarithmic equation with exponential growth.Applied Mathematics Letters, 2022
[15]Chen, Sitong, Tang, Xianhua, Wei, Jiuyang, Nehari-type ground state solutions for a Choquard equation with doubly critical exponents.Advances In Nonlinear Analysis, 2021: 152-171.
[16]Chen, Sitong, Tang, Xianhua, Wei, Jiuyang, Improved results on planar Kirchhoff-type elliptic problems with critical exponential growth.Zeitschrift Fur Angewandte Mathematik Und Physik, 2021
[17]Chen, Sitong, Tang, Xianhua, Existence and multiplicity of solutions for Dirichlet problem of p(x)-Laplacian type without the Ambrosetti-Rabinowitz condition.Journal Of Mathematical Analysis And Applications, 2021
[18]Chen, Sitong, Radulescu, Vicentiu D., Tang, Xianhua, Normalized Solutions of Nonautonomous Kirchhoff Equations: Sub- and Super-critical Cases.Applied Mathematics And Optimization, 2021: 773-806.
[19]Tang, Xianhua, Chen, Sitong, Singularly perturbed Choquard equations with nonlinearity satisfying Berestycki-Lions assumptions.Advances In Nonlinear Analysis, 2020: 413-437.
[20]Chen, Sitong, Tang, Xianhua, Berestycki-Lions conditions on ground state solutions for a Nonlinear Schrodinger equation with variable potentials.Advances In Nonlinear Analysis, 2020: 496-515.

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