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- Jafar Biazar

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
34
Citations
4,929
188
World Ranking
2050
National Ranking
17

- Partial differential equation
- Differential equation
- Ordinary differential equation

In his research, Jafar Biazar performs multidisciplinary study on Applied mathematics and Numerical analysis. In his works, he performs multidisciplinary study on Numerical analysis and Applied mathematics. Jafar Biazar combines topics linked to Exact solutions in general relativity with his work on Mathematical analysis. His Exact solutions in general relativity study frequently draws parallels with other fields, such as Mathematical analysis. His study ties his expertise on Perturbation (astronomy) together with the subject of Quantum mechanics. As part of his studies on Perturbation (astronomy), Jafar Biazar often connects relevant areas like Quantum mechanics. He performs integrative study on Adomian decomposition method and Differential equation. Jafar Biazar integrates many fields, such as Differential equation and Adomian decomposition method, in his works. His work on Pure mathematics is being expanded to include thematically relevant topics such as Homotopy perturbation method.

- Exact solutions for non-linear Schrödinger equations by He's homotopy perturbation method (164 citations)
- Convergence of the homotopy perturbation method for partial differential equations (133 citations)
- Solution of the system of ordinary differential equations by Adomian decomposition method (116 citations)

Mathematical analysis and Numerical analysis are commonly linked in his work. His work on Mathematical analysis expands to the thematically related Numerical analysis. His research combines Perturbation (astronomy) and Quantum mechanics. His work on Quantum mechanics expands to the thematically related Perturbation (astronomy). He undertakes interdisciplinary study in the fields of Adomian decomposition method and Differential equation through his works. His study deals with a combination of Differential equation and Nonlinear system. Borrowing concepts from Partial differential equation, Jafar Biazar weaves in ideas under Nonlinear system. Jafar Biazar combines Partial differential equation and Adomian decomposition method in his research. Pure mathematics is closely attributed to Homotopy perturbation method in his work.

- Applied mathematics (93.18%)
- Mathematical analysis (88.64%)
- Quantum mechanics (59.09%)

- Applied mathematics (80.00%)
- Mathematical analysis (80.00%)
- Quantum mechanics (60.00%)

Many of his studies involve connections with topics such as Type (biology) and Series (stratigraphy) and Paleontology. Series (stratigraphy) is closely attributed to Paleontology in his study. His work on Statistics is being expanded to include thematically relevant topics such as Decomposition method (queueing theory), Estimation theory and Shape parameter. Decomposition method (queueing theory) and Statistics are commonly linked in his work. His Ecology research is linked to Decomposition and Type (biology). In his works, Jafar Biazar conducts interdisciplinary research on Decomposition and Ecology. Jafar Biazar undertakes multidisciplinary investigations into Applied mathematics and Numerical analysis in his work. His work blends Numerical analysis and Applied mathematics studies together. Mathematical analysis is frequently linked to Traveling wave in his study.

- The first integral method for solving some conformable fractional differential equations (27 citations)
- Resonant solitons to the nonlinear Schrödinger equation with different forms of nonlinearities (20 citations)
- An interval for the shape parameter in radial basis function approximation (14 citations)

- Statistics
- Numerical analysis
- Algorithm

His study in Conformable matrix extends to Quantum mechanics with its themes. Jafar Biazar incorporates Mathematical analysis and Integral equation in his studies. He combines Integral equation and Mathematical analysis in his studies. Jafar Biazar integrates several fields in his works, including Applied mathematics and Numerical analysis. Jafar Biazar performs multidisciplinary studies into Numerical analysis and Applied mathematics in his work. While working on this project, Jafar Biazar studies both Nonlinear system and Nonlinear Schrödinger equation. Jafar Biazar combines Nonlinear Schrödinger equation and Nonlinear system in his studies. Jafar Biazar undertakes interdisciplinary study in the fields of Mathematical physics and Quantum mechanics through his research. As part of his studies on Interpolation (computer graphics), he often connects relevant subjects like Animation.

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.

Exact solutions for non-linear Schrödinger equations by He's homotopy perturbation method

J. Biazar;H. Ghazvini;H. Ghazvini.

Physics Letters A **(2007)**

225 Citations

Solution of the system of ordinary differential equations by Adomian decomposition method

J. Biazar;E. Babolian;R. Islam.

Applied Mathematics and Computation **(2004)**

212 Citations

Convergence of the homotopy perturbation method for partial differential equations

J. Biazar;H. Ghazvini;H. Ghazvini.

Nonlinear Analysis-real World Applications **(2009)**

197 Citations

The decomposition method applied to systems of Fredholm integral equations of the second kind

E. Babolian;J. Biazar;A. R. Vahidi.

Applied Mathematics and Computation **(2004)**

193 Citations

On the order of convergence of Adomian method

E. Babolian;J. Biazar.

Applied Mathematics and Computation **(2002)**

192 Citations

Solution of nonlinear equations by modified adomian decomposition method

E. Babolian;J. Biazar.

Applied Mathematics and Computation **(2002)**

190 Citations

He's homotopy perturbation method for solving systems of Volterra integral equations of the second kind

J. Biazar;H. Ghazvini;H. Ghazvini.

Chaos Solitons & Fractals **(2009)**

170 Citations

Solution of the epidemic model by Adomian decomposition method

J. Biazar.

Applied Mathematics and Computation **(2006)**

152 Citations

A new homotopy perturbation method for solving systems of partial differential equations

Jafar Biazar;Mostafa Eslami;Mostafa Eslami.

Computers & Mathematics With Applications **(2011)**

144 Citations

An alternate algorithm for computing Adomian polynomials in special cases

J. Biazar;E. Babolian;G. Kember;A. Nouri.

Applied Mathematics and Computation **(2003)**

138 Citations

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