基本情况：

杨翔宇，博士毕业于大连理工大学应用数学专业，研究方向为可积系统中的非线性波。现主持国家自然科学基金项目一项。

工作经历：

2025.01-至今  mansion88明升  mansion88明升  讲师

联系方式：

Email: yangx@zut.edu.cn

论文：

[1] Anomalous Scattering of Lumps and Interaction of Lump Chains in the Modified Kadomtsev–Petviashvili-I Equation, Studies in Applied Mathematics 156 (2026) e70174.

[2] Nonlocal KdV hierarchy reduction and asymptotic solutions in the nonlocal Lakshmanan–Porsezian–Daniel equation, Chaos, Solitons & Fractals 206 (2026) 2026117982.

[3] The defocusing Lakshmanan–Porsezian–Daniel equation with elliptic function backgrounds: N-elliptic-dark solitons and asymptotic behaviors, Applied Mathematics Letters 171 (2025) 2025109684.

[4] Solitons in the Fifth-Order KdV Equation with a Perturbation, Chinese Physics Letters 42 (2025) 010202.

[5] Slowly varying solitary waves in the extended shallow water model with a perturbation term, Physica Scripta 100 (2025).

[6] Generation of anomalously scattered lump waves for (2+1)-dimensional Date–Jimbo–Kashiwara–Miwa equation, The European Physical Journal Plus 140 (2025).

[7] Multi-pole lump solutions and anomalous scattering in the BKP equation, Chaos, Solitons & Fractals 198 (2025) 2025116522.

[8] Decay mode ripple waves within the (3+1)-dimensional Kadomtsev–Petviashvili equation, Mathematical Methods in the Applied Sciences 47 (2024) 10444-10461.

[9] Solitons, Lumps, Breathers, and Interaction Phenomena for a (2+1)-Dimensional Variable-Coefficient Extended Shallow-Water Wave Equation, Mathematics 12 (2024) 3054.

[10] Solitons and lump waves to the elliptic cylindrical Kadomtsev–Petviashvili equation, Communications in Nonlinear Science and Numerical Simulation 131 (2024) 2024107837.

[11] Resonantly interacting lump chains in the Mel'nikov equation, Physics Letters A 478 (2023) 2023128910.

[12] Generation of anomalously scattered lumps via lump chains degeneration within the Mel’nikov equation, Nonlinear Dynamics 111 (2023) 15293-15307.

[13] Degenerate lump wave solutions of the Mel’nikov equation, Nonlinear Dynamics 111 (2023) 1553-1563.

[14] Multi-lump formations from lump chains and plane solitons in the KP1 equation, Nonlinear Dynamics 111 (2023) 1625-1642.

[15] Rare decaying ripple solutions within the KP equation, Physica D 456 (2023) 2023133920.

[16] Solving Benjamin–Ono equation via gradient balanced PINNs approach, The European Physical Journal Plus 137 (2022).

[17] Generation mechanism of high-order rogue waves via the improved long-wave limit method: NLS case, Physics Letters A 450 (2022) 2022128395.

[18] A direct method for generating rogue wave solutions to the (3+1)-dimensional Korteweg-de Vries Benjamin-Bona-Mahony equation, Physics Letters A 449 (2022) 2022128355.

[19] Soliton molecules and novel smooth positons for the complex modified KdV equation, Applied Mathematics Letters 103 (2020) 2019106168.

[20] Novel soliton molecules and breather-positon on zero background for the complex modified KdV equation, Nonlinear Dynamics 100 (2020) 1551-1557.

[21] Breathers, lumps and hybrid solutions of the (2+1)-dimensional Hirota-Satsuma-Ito equation, Rocky Mountain Journal of Mathematics 50 (2020) 319-335.

[22] Soliton molecules and some novel interaction solutions to the (2+1)-dimensional B-type Kadomtsev-Petviashvili equation, Physica Scripta 95 (2020).

[23] Soliton molecules and dynamics of the smooth positon for the Gerdjikov-Ivanov equation, Chinese Physics B 29 (2020).

[24] Trajectory equation of a lump before and after collision with line, lump, and breather waves for (2+1)-dimensional Kadomtsev-Petviashvili equation, Chinese Physics B 28 (2019).

[25] High-order breathers, lumps and hybrid solutions to the (2+1)-dimensional fifth-order KdV equation, International Journal of Modern Physics B 33 (2019) 1950255.