胡恒春照片

胡恒春副教授硕士生导师

研究方向:孤立子理论;可积系统

办公室:卓越楼 816 室 邮箱:hhengchun@163.com 更新时间:2026-06-01

Hu HengchunAssociate ProfessorMaster's Supervisor

Research: Soliton theory; integrable systems

Office: Room 816, Zhuoyue Building | Email: hhengchun@163.com | Last updated: 2026-06-01

教育背景与工作经历

教育背景

  • 2002年 - 2005年 上海交通大学理论物理专业博士
  • 1999年 - 2002年 中国矿业大学(北京)应用数学专业硕士
  • 1995年 - 1999年 江苏师范大学数学与应用数学专业学士

工作经历

  • 2007年至今 上海理工大学副教授
  • 2015年2月 - 2016年2月 美国德克萨斯大学大河谷分校访问学者
  • 2005年 - 2007年 上海理工大学讲师

科研项目

  • 作为项目负责人获得国家自然科学青年基金资助,作为主要成员参研国家自然科学基金面上项目多项

代表性论著

  • 1. Hu HengChun, Xu Xu. Abundant invariant solutions of (3+1)-dimensional combined pKP-BKP equation. Chinese Physics. B, 2025, 34(3): 030501.
  • 2. Hu HengChun, Yang ChengCheng. Abundant interaction solutions of the integrable (1+1)-dimensional coupled KdV system. MATHEMATICAL METHODS IN THE APPLIED SCIENCES, 2024, 47(8): 7017-7027.
  • 3. Hu HengChun, Kang JiaLi. Abundant invariant solutions of extended (3+1)-dimensional KP–Boussinesq equation. Chinese Physics. B, 2024, 33(11): 110206.
  • 4. Feng BaoFeng, Hu HengChun. Integrable Semi-Discretization for a Modified Camassa–Holm Equation with Cubic Nonlinearity. Symmetry Integrability and Geometry-Methods and Applications, 2024, 20(10): 091.
  • 5. Hu HengChun, Tian YunMan. Lump-kink and hybrid solutions of the extended (3+1)-dimensional potential KP equation in fluid mechanics. MODERN PHYSICS LETTERS B, 2024, 38(32): 2450325.
  • 6. Hu HengChun, Li YaQi. Lie symmetry analysis and invariant solutions for the (3+1)-dimensional Virasoro integrable model. Chinese Physics. B, 2023, 32(4): 040503.
  • 7. Hu HengChun, Li YaQi. Symmetry analysis and soliton–cnoidal solutions of the negative-order Calogero–Bogoyavlenskii–Schiff equation in fluid mechanics. INTERNATIONAL JOURNAL OF MODERN PHYSICS B, 2023, 37(15): 2350148.
  • 8. Hu HengChun, Sun RunLan. Lie symmetry analysis and invariant solutions of (3 + 1)-dimensional Date–Jimbo–Kashiwara–Miwa equation. MODERN PHYSICS LETTERS B, 2022, 36(05): 2150587.
  • 9. Hu HengChun. New interaction solutions of the similarity reduction for the integrable (2+1)-dimensional Boussinesq equation. INTERNATIONAL JOURNAL OF MODERN PHYSICS B, 2022, 36(01): 2250001.
  • 10. Hu HengChun, Li XiaoDan. Nonlocal symmetry and interaction solutions for the new (3+1)-dimensional integrable Boussinesq equation. Mathematical Modelling of Natural Phenomena, 2022, 17(02): 2022001.
  • 11. Hu HengChun, Zhang YuQing. Novel interaction phenomena of the new (2+1)-dimensional extended shallow water wave equation. MODERN PHYSICS LETTERS B, 2022, 36(12): 2250059.
  • 12. Li XiaoDan, Hu HengChun. Integrability and new interaction solutions of (3+1)-dimensional Boussinesq equation. Journal of University of Shanghai for Science and Technology, 2021, 43(03): 213-218.
  • 13. Hu HengChun, Li XiaoDan. Symmetry reduction and new interaction solutions for the negative-order potential KdV equation. MODERN PHYSICS LETTERS B, 2021, 35(6): 2150108(13PP).
  • Published more than 40 papers in domestic and foreign academic journals.
  • 1.Hengchun Hu, Xu Xu, Abundant invariant solutions of (3+1)-dimensional combined pKP-BKP equation, Chinese Physics B 34 (2025) 030501
  • 2.Hengchun Hu, Jiali Kang, Abundant invariant solutions of extended (3+1)-dimensional KP–Boussinesq equation, Chinese Physics B 33 (2024) 110206
  • 3.Hengchun Hu, Yunman Tian, Lump-kink and hybrid solutions of the extended (3+1)-dimensional potential KP equation in fluid mechanics, Modern Physics Letters B 38 (2024) 2450325
  • 4.Hengchun Hu, Chengcheng Yang, Abundant interaction solutions of the integrable (1 + 1)-dimensional coupled KdV system, Mathematical Method in the Applied Science (2024), 1–11, DOI:10.1002/mma.9954
  • 5.Hengchun Hu, Yaqi Li, Symmetry analysis and soliton-cnoidal solutions of the negative-order Calogero-Bogoyavlenskii-Schiff equation in fluid mechanics, International Journal of Modern Physics B 37 (2023) 2350148
  • 6.Hengchun Hu, Yaqi Li, Lie symmetry analysis and invariant solutions for the (3+1)-dimensional Virasoro integrable model, Chinese Physics B 32 (2023) 040503
  • 7.Hengchun Hu, Xiaodan Li, New interaction solutions of the similarity reduction for the integrable (2+1)-dimensional Boussinesq equation, International Journal of Modern Physics B 36 (2022) 2250001
  • 8.Hengchun Hu, Xiaodan Li, Nonlocal symmetry and interaction solutions for the new (3+1)-dimensional integrable Boussinesq equation, Mathematical Modelling of Natural Phenomena 17 (2022) 2
  • 9.Hengchun Hu, Zhenya Zhang, Symmetry reduction and new interaction solutions for the negative-order potential KdV equation, Modern Physics Letters B 35 (2021) 2150108
  • 10.Yuqing Zhang, Hengchun Hu, Novel interaction phenomena of the new (2+1)-dimensional extended shallow water wave equation, Modern Physics Letters B 36 (2022) 2250059
  • 11.Hengchun Hu, Feiyan Liu, New interaction solutions and nonlocal symmetry of an equation combining the modified Calogero-Bogoyavlenskii-Schiff equation with its negative-order form, Communications in Theoretical Physics 72 (2020) 065002
  • 12.Hengchun Hu, Yihui Lu, Lie group analysis and invariant solutions of (3+1)-dimensional B-type Kadomtsev-Petviashvili-Boussinesq equation, Modern Physics Letters B 34 (2020) 2050106
  • 13.Hengchun Hu, Yueyue Li, Haidong Zhu, Nonlocal symmetries, consistent tanh expansion solvability and interaction solutions for a new fifth-order nonlinear integrable equation, Waves in Random and Complex Media 30 (2020) 208-215
  • 14.Bo Zhang, Hengchun Hu, Similarity Reduction and Exact Solutions of a Boussinesq-like Equation, Z. Naturforsh. A 73 (2018) 357-362
  • 15.Hengchun Hu, Yueyue Li, Haidong Zhu, Residual symmetry, interaction solutions and consistent tanh expansion solvability for the third-order Burgers equation, Chaos, Solitons and Fractals 108 (2018) 77-81
  • 16.Juncai Pu, Hengchun Hu, Mixed lump-soliton solutions of the (3+1)-dimensional soliton equation, Applied Mathematics Letters 85 (2018) 77-81

主讲课程

  • 高等数学;孤立子理论

荣誉、学术兼职与社会服务

暂无提交内容。

Education & Work Experience

Education

  • 2002-2005, Ph.D. in Theoretical Physics, Shanghai Jiao Tong University.
  • 1999-2002, M.S. in Applied Mathematics, China University of Mining and Technology-Beijing.
  • 1995-1999, B.S. in Mathematics and Applied Mathematics, Jiangsu Normal University.

Work Experience

  • 2007-present, Associate Professor, University of Shanghai for Science and Technology.
  • February 2015 - February 2016, Visiting Scholar, University of Texas Rio Grande Valley.
  • 2005-2007, Lecturer, University of Shanghai for Science and Technology.

Research Projects

  • As the project leader, he received funding from the National Natural Science Foundation for Youth, and as a key member participated in a number of National Natural Science Foundation general projects.

Selected Publications

  • 1. Hu HengChun, Xu Xu. Abundant invariant solutions of (3+1)-dimensional combined pKP-BKP equation. Chinese Physics. B, 2025, 34(3): 030501.
  • 2. Hu HengChun, Yang ChengCheng. Abundant interaction solutions of the integrable (1+1)-dimensional coupled KdV system. MATHEMATICAL METHODS IN THE APPLIED SCIENCES, 2024, 47(8): 7017-7027.
  • 3. Hu HengChun, Kang JiaLi. Abundant invariant solutions of extended (3+1)-dimensional KP–Boussinesq equation. Chinese Physics. B, 2024, 33(11): 110206.
  • 4. Feng BaoFeng, Hu HengChun. Integrable Semi-Discretization for a Modified Camassa–Holm Equation with Cubic Nonlinearity. Symmetry Integrability and Geometry-Methods and Applications, 2024, 20(10): 091.
  • 5. Hu HengChun, Tian YunMan. Lump-kink and hybrid solutions of the extended (3+1)-dimensional potential KP equation in fluid mechanics. MODERN PHYSICS LETTERS B, 2024, 38(32): 2450325.
  • 6. Hu HengChun, Li YaQi. Lie symmetry analysis and invariant solutions for the (3+1)-dimensional Virasoro integrable model. Chinese Physics. B, 2023, 32(4): 040503.
  • 7. Hu HengChun, Li YaQi. Symmetry analysis and soliton–cnoidal solutions of the negative-order Calogero–Bogoyavlenskii–Schiff equation in fluid mechanics. INTERNATIONAL JOURNAL OF MODERN PHYSICS B, 2023, 37(15): 2350148.
  • 8. Hu HengChun, Sun RunLan. Lie symmetry analysis and invariant solutions of (3 + 1)-dimensional Date–Jimbo–Kashiwara–Miwa equation. MODERN PHYSICS LETTERS B, 2022, 36(05): 2150587.
  • 9. Hu HengChun. New interaction solutions of the similarity reduction for the integrable (2+1)-dimensional Boussinesq equation. INTERNATIONAL JOURNAL OF MODERN PHYSICS B, 2022, 36(01): 2250001.
  • 10. Hu HengChun, Li XiaoDan. Nonlocal symmetry and interaction solutions for the new (3+1)-dimensional integrable Boussinesq equation. Mathematical Modelling of Natural Phenomena, 2022, 17(02): 2022001.
  • 11. Hu HengChun, Zhang YuQing. Novel interaction phenomena of the new (2+1)-dimensional extended shallow water wave equation. MODERN PHYSICS LETTERS B, 2022, 36(12): 2250059.
  • 12. Li XiaoDan, Hu HengChun. Integrability and new interaction solutions of (3+1)-dimensional Boussinesq equation. Journal of University of Shanghai for Science and Technology, 2021, 43(03): 213-218.
  • 13. Hu HengChun, Li XiaoDan. Symmetry reduction and new interaction solutions for the negative-order potential KdV equation. MODERN PHYSICS LETTERS B, 2021, 35(6): 2150108(13PP).
  • Published more than 40 papers in domestic and foreign academic journals.
  • 1.Hengchun Hu, Xu Xu, Abundant invariant solutions of (3+1)-dimensional combined pKP-BKP equation, Chinese Physics B 34 (2025) 030501
  • 2.Hengchun Hu, Jiali Kang, Abundant invariant solutions of extended (3+1)-dimensional KP–Boussinesq equation, Chinese Physics B 33 (2024) 110206
  • 3.Hengchun Hu, Yunman Tian, Lump-kink and hybrid solutions of the extended (3+1)-dimensional potential KP equation in fluid mechanics, Modern Physics Letters B 38 (2024) 2450325
  • 4.Hengchun Hu, Chengcheng Yang, Abundant interaction solutions of the integrable (1 + 1)-dimensional coupled KdV system, Mathematical Method in the Applied Science (2024), 1–11, DOI:10.1002/mma.9954
  • 5.Hengchun Hu, Yaqi Li, Symmetry analysis and soliton-cnoidal solutions of the negative-order Calogero-Bogoyavlenskii-Schiff equation in fluid mechanics, International Journal of Modern Physics B 37 (2023) 2350148
  • 6.Hengchun Hu, Yaqi Li, Lie symmetry analysis and invariant solutions for the (3+1)-dimensional Virasoro integrable model, Chinese Physics B 32 (2023) 040503
  • 7.Hengchun Hu, Xiaodan Li, New interaction solutions of the similarity reduction for the integrable (2+1)-dimensional Boussinesq equation, International Journal of Modern Physics B 36 (2022) 2250001
  • 8.Hengchun Hu, Xiaodan Li, Nonlocal symmetry and interaction solutions for the new (3+1)-dimensional integrable Boussinesq equation, Mathematical Modelling of Natural Phenomena 17 (2022) 2
  • 9.Hengchun Hu, Zhenya Zhang, Symmetry reduction and new interaction solutions for the negative-order potential KdV equation, Modern Physics Letters B 35 (2021) 2150108
  • 10.Yuqing Zhang, Hengchun Hu, Novel interaction phenomena of the new (2+1)-dimensional extended shallow water wave equation, Modern Physics Letters B 36 (2022) 2250059
  • 11.Hengchun Hu, Feiyan Liu, New interaction solutions and nonlocal symmetry of an equation combining the modified Calogero-Bogoyavlenskii-Schiff equation with its negative-order form, Communications in Theoretical Physics 72 (2020) 065002
  • 12.Hengchun Hu, Yihui Lu, Lie group analysis and invariant solutions of (3+1)-dimensional B-type Kadomtsev-Petviashvili-Boussinesq equation, Modern Physics Letters B 34 (2020) 2050106
  • 13.Hengchun Hu, Yueyue Li, Haidong Zhu, Nonlocal symmetries, consistent tanh expansion solvability and interaction solutions for a new fifth-order nonlinear integrable equation, Waves in Random and Complex Media 30 (2020) 208-215
  • 14.Bo Zhang, Hengchun Hu, Similarity Reduction and Exact Solutions of a Boussinesq-like Equation, Z. Naturforsh. A 73 (2018) 357-362
  • 15.Hengchun Hu, Yueyue Li, Haidong Zhu, Residual symmetry, interaction solutions and consistent tanh expansion solvability for the third-order Burgers equation, Chaos, Solitons and Fractals 108 (2018) 77-81
  • 16.Juncai Pu, Hengchun Hu, Mixed lump-soliton solutions of the (3+1)-dimensional soliton equation, Applied Mathematics Letters 85 (2018) 77-81

Courses

  • Advanced Mathematics; Soliton Theory

Honors, Academic Service and Social Service

Not provided.