2021.9-今, 山东大学副教授
2019.7-2021.9,山东大学,助理研究员;
2017.06—2019.04 加拿大,阿尔伯塔大学(University of Alberta)数学与统计科学系,应用数学, 联合培养博士;
2015.9 – 2019.6 四川大学, 数学学院/应用数学, 博士;
2012.9 – 2015.6 四川大学,数学学院/基础数学,硕士;
2007.9 – 2011.6 , 山东大学(威海), 数学学院/数学与应用数学, 学士.
微分方程定性理论,KAM理论
1. 微分方程定性理论,KAM理论
1. Guan, Xinyu. ALMOST-PERIODIC BIFURCATIONS FOR 2-DIMENSIONAL DEGENERATE HAMILTONIAN VECTOR FIELDS. JOURNAL OF APPLIED ANALYSIS AND COMPUTATION, 13, 3054-3073, 2023.
2. Xin Yu GUAN. Response Solutions for Degenerate Reversible Harmonic Oscillators with Zero-average Perturbation. Acta Mathematica Sinica-English Series, 39, 2006-2030, 2023.
3. Zhou, Guangzhao. COEXISTENCE OF HYPERBOLIC AND ELLIPTIC INVARIANT TORI FOR COMPLETELY DEGENERATE QUASI-PERIODICALLY FORCED MAPS. Communications in Pure And Applied Analysis, 22, 1296-1317, 2023.
4. 司文. Degenerate response tori in Hamiltonian systems with higher zero-average perturbation. Journal of Mathematical Physics, 63, 2022.
5. 张渊. Construction of quasi-periodic solutions for nonlinear forced perturbations of dissipative Boussinesq systems. 67, 2022.
6. 景天琪. Moser's theorem for hyperbolic-type degenerate lower tori in Hamiltonian system. JOURNAL OF DIFFERENTIAL EQUATIONS Journal, 299, 602, 2021.
7. 景天琪. Moser's theorem for hyperbolic-type degenerate lower tori in Hamiltonian system. JOURNAL OF DIFFERENTIAL EQUATIONS Journal, 299, 602, 2021.
8. 司文. Response Solutions in Degenerate Oscillators Under Degenerate Perturbations. ANNALES HENRI POINCARE, 2021.
9. 景天琪. COMPLETELY DEGENERATE LOWER-DIMENSIONAL INVARIANT TORI IN REVERSIBLE SYSTEMS. PROCEEDINGS OF THE AMERICAN MATHEMATICAL SOCIETY Journal, 149, 4247, 2021.
10. 司文. RESPONSE SOLUTIONS FOR DEGENERATE REVERSIBLE HARMONIC OSCILLATORS. Discrete and Continuous Dynamical Systems, 41, 3951, 2021.
11. 许晓丹. Stoker's Problem for Quasi-periodically Forced Reversible Systems with Multidimensional Liouvillean Frequency. SIAM JOURNAL ON APPLIED DYNAMICAL SYSTEMS, 19, 2286, 2020.
12. 程红玉. Whiskered Tori for Forced Beam Equations with Multi-dimensional Liouvillean Frequency. Journal of Dynamics and Differential Equations, 32, 705, 2020.
13. 司文. Completely degenerate responsive tori in Hamiltonian systems. Nonlinearity, 33, 6072, 2020.
14. 司文. Response solutions for degenerate reversible harmonic oscillators. Discrete and Continuous Dynamical Systems, 41, 3951, 2021.
15. Guan, Xinyu. Parabolic invariant tori in quasi-periodically forced skew-product maps. JOURNAL OF DIFFERENTIAL EQUATIONS Journal, 277, 234, 2021.
16. 司文. ALMOST-PERIODIC PERTURBATIONS OF NON-HYPERBOLIC EQUILIBRIUM POINTS VIA POSCHEL-RUSSMANN KAM METHOD. COMMUNICATIONS ON PURE AND APPLIED ANALYSIS, 19, 541, 2020.
17. 司文. Almost-periodic bifurcations for one-dimensional degenerate vector fields. DYNAMICAL SYSTEMS-AN INTERNATIONAL JOURNAL, 35, 242, 2020.
1. 奇性线性哈密顿系统的指标理论及其应用, 2021/10/12-2025/12/31
2. 法向退化KAM环面的存在性研究, 2020/12/12-2023/12/31
3. 拟周期驱动系统的KAM理论若干问题研究, 2020/09/18-2023/12/31
4. 哈密顿系统中奇性轨道的研究, 2020/09/18-2024/12/31
1. 山东大学青年学者未来计划
2. 2021年济南市青年创新先锋
1. 动力系统专题
2. 常微分方程专题
3. 常微分方程专题
4. 常微分方程定性理论
5. 动力系统
6. 动力系统
7. 常微分方程专题
8. 高等数学(2)
9. 数学分析(2)
10. 数学分析(3)
11. 代数和几何基础
1.梁彦博
2.姜晓婕
3.高小雅
4.刘昶昱
