| Journal: | Revista mexicana de física |
| Database: | PERIÓDICA |
| System number: | 000425395 |
| ISSN: | 0035-001X |
| Authors: | Yépez Martínez, H1 Gómez Aguilar, F2 Sosa, I.O1 Reyes, J.M1 Torres Jiménez, J3 |
| Institutions: | 1Universidad Autónoma de la Ciudad de México, Ciudad de México. México 2Tecnológico Nacional de México, Centro Nacional de Investigación y Desarrollo Tecnológico, Cuernavaca, Morelos. México 3Instituto Tecnológico Superior de Irapuato, Maestría en Ingeniería Eléctrica, Irapuato, Guanajuato. México |
| Year: | 2016 |
| Season: | Jul-Ago |
| Volumen: | 62 |
| Number: | 4 |
| Country: | México |
| Language: | Inglés |
| Document type: | Artículo |
| Approach: | Analítico, teórico |
| English abstract | In this paper, the fractional derivatives in the sense of the modified Riemann-Liouville derivative and the Feng’s first integral method are employed for solving the important nonlinear coupled space-time fractional mKdV partial differential equation, this approach provides new exact solutions through establishing first integrals of the mKdV equation. The present method is efficient, reliable, and it can be used as an alternative to establish new solutions of different types of fractional differential equations applied in mathematical physics |
| Disciplines: | Física y astronomía |
| Keyword: | Física, Primer método integral de Feng, Derivada de Riemann-Liouville, Ecuación modificada de Korteweg de-Vries, Ecuaciones diferenciales no lineales, Soluciones analíticas |
| Keyword: | Physics, Feng’s first integral method, Riemann-Liouville derivative, Modified Korteweg de-Vries equation, Nonlinear fractional differential equations, Analytical solutions |
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