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- Hongqing Zhang

Discipline name
D-index
D-index (Discipline H-index) only includes papers and citation values for an examined
discipline in contrast to General H-index which accounts for publications across all
disciplines.
Citations
Publications
World Ranking
National Ranking

Mathematics
D-index
38
Citations
6,877
141
World Ranking
1561
National Ranking
79

- Mathematical analysis
- Partial differential equation
- Algebra

His primary scientific interests are in Mathematical analysis, Applied mathematics, Partial differential equation, Korteweg–de Vries equation and Soliton. His Mathematical analysis study focuses mostly on Elliptic function, Symbolic computation, Riccati equation and Cnoidal wave. His Applied mathematics study combines topics from a wide range of disciplines, such as Simple and Homotopy analysis method.

His Partial differential equation research is mostly focused on the topic First-order partial differential equation. The various areas that Hongqing Zhang examines in his Korteweg–de Vries equation study include Conservation law, Type, Order and Mathematical physics. His Soliton research includes themes of Theta function, Hyperbolic function, One-dimensional space and Integrable system.

- A note on the homogeneous balance method (476 citations)
- Fractional sub-equation method and its applications to nonlinear fractional PDEs (312 citations)
- New explicit solitary wave solutions and periodic wave solutions for Whitham–Broer–Kaup equation in shallow water (305 citations)

His scientific interests lie mostly in Mathematical analysis, Partial differential equation, Symbolic computation, Applied mathematics and Numerical analysis. His work in Mathematical analysis is not limited to one particular discipline; it also encompasses Soliton. The study incorporates disciplines such as Korteweg–de Vries equation and Initial value problem in addition to Partial differential equation.

His work carried out in the field of Korteweg–de Vries equation brings together such families of science as Kadomtsev–Petviashvili equation and Mathematical physics. His research on Symbolic computation also deals with topics like

- Transformation and sine-Gordon equation most often made with reference to One-dimensional space,
- Nonlinear evolution which connect with Traveling wave. Hongqing Zhang has included themes like Numerical partial differential equations and Evolution equation in his Numerical analysis study.

- Mathematical analysis (71.43%)
- Partial differential equation (37.14%)
- Symbolic computation (26.43%)

- Mathematical analysis (71.43%)
- Partial differential equation (37.14%)
- Soliton (22.14%)

The scientist’s investigation covers issues in Mathematical analysis, Partial differential equation, Soliton, Integrable system and Mathematical physics. Hongqing Zhang undertakes multidisciplinary studies into Mathematical analysis and Construct in his work. Hongqing Zhang has researched Partial differential equation in several fields, including Exact solutions in general relativity, Hyperbolic function and Applied mathematics.

His studies deal with areas such as Elliptic function and Symbolic computation as well as Applied mathematics. His study in Soliton is interdisciplinary in nature, drawing from both Nonlinear differential equations and Exponential function. His Integrable system study integrates concerns from other disciplines, such as Korteweg–de Vries equation, Matrix, Variable coefficient and Kadomtsev–Petviashvili equation.

- Fractional sub-equation method and its applications to nonlinear fractional PDEs (312 citations)
- On the Integrability of a Generalized Variable‐Coefficient Forced Korteweg‐de Vries Equation in Fluids (122 citations)
- On the integrability of a generalized variable-coefficient Kadomtsev–Petviashvili equation (94 citations)

- Mathematical analysis
- Algebra
- Partial differential equation

Hongqing Zhang focuses on Mathematical analysis, Mathematical physics, Fractional calculus, Korteweg–de Vries equation and Soliton. In his research, Hongqing Zhang undertakes multidisciplinary study on Mathematical analysis and Beta. His Fractional calculus study incorporates themes from Homotopy analysis method and Differential equation.

His studies in Korteweg–de Vries equation integrate themes in fields like Covariant transformation, Conservation law, Variable and Integrable system. The various areas that Hongqing Zhang examines in his Soliton study include Periodic wave, Nonlinear differential equations, One-dimensional space and Generalization. His First-order partial differential equation research is multidisciplinary, relying on both Hyperbolic partial differential equation, Numerical partial differential equations, Stochastic partial differential equation and Method of characteristics.

This overview was generated by a machine learning system which analysed the scientist’s body of work. If you have any feedback, you can contact us here.

A note on the homogeneous balance method

Engui Fan;Hongqing Zhang.

Physics Letters A **(1998)**

779 Citations

Fractional sub-equation method and its applications to nonlinear fractional PDEs

Sheng Zhang;Sheng Zhang;Hong-Qing Zhang.

Physics Letters A **(2011)**

527 Citations

New explicit solitary wave solutions and periodic wave solutions for Whitham–Broer–Kaup equation in shallow water

Zhenya Yan;Hongqing Zhang.

Physics Letters A **(2001)**

481 Citations

New explicit and exact travelling wave solutions for a system of variant Boussinesq equations in mathematical physics

Zhenya Yan;Hongqing Zhang.

Physics Letters A **(1999)**

268 Citations

Application of homotopy analysis method to fractional KdV–Burgers–Kuramoto equation

Lina Song;Hongqing Zhang.

Physics Letters A **(2007)**

221 Citations

Further improved F-expansion method and new exact solutions of Konopelchenko–Dubrovsky equation

Dengshan Wang;Hong-Qing Zhang.

Chaos Solitons & Fractals **(2005)**

208 Citations

Symbolic computation and new families of exact soliton-like solutions to the integrable Broer-Kaup (BK) equations in (2+1)-dimensional spaces

Zhen-ya Yan;Hong-qing Zhang.

Journal of Physics A **(2001)**

187 Citations

A generalized F-expansion method to find abundant families of Jacobi Elliptic Function solutions of the (2 + 1)-dimensional Nizhnik–Novikov–Veselov equation

Yu-Jie Ren;Hong-Qing Zhang.

Chaos Solitons & Fractals **(2006)**

182 Citations

New exact solutions to a system of coupled KdV equations

Engui Fan;Hongqing Zhang.

Physics Letters A **(1998)**

176 Citations

Explicit and exact traveling wave solutions of Whitham-Broer-Kaup shallow water equations

Fuding Xie;Zhenya Yan;Hongqing Zhang.

Physics Letters A **(2001)**

167 Citations

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