Zobrazeno 1 - 10
of 126
pro vyhledávání: '"Perez-Sesma, A."'
Autor:
Filobello-Nino, U., Vazquez-Leal, H., Sarmiento-Reyes, A., Cervantes-Perez, J., Perez-Sesma, A., Jimenez-Fernandez, V.M., Pereyra-Diaz, D., Huerta-Chua, J., Morales-Mendoza, L.J., Gonzalez-Lee, M., Castro-Gonzalez, F.
Publikováno v:
In Applied Mathematical Modelling January 2017 41:180-194
Autor:
Filobello-Nino, U., Vazquez-Leal, H., Pereyra-Diaz, D., Yildirim, A., Perez-Sesma, A., Castaneda-Sheissa, R., Sanchez-Orea, J., Hoyos-Reyes, C.
Publikováno v:
In Applied Mathematics and Computation 15 February 2013 219(12):6707-6718
Autor:
U. Filobello-Nino, H. Vazquez-Leal, B. Benhammouda, A. Perez-Sesma, V. M. Jimenez-Fernandez, J. Cervantes-Perez, A. Sarmiento-Reyes, J. Huerta-Chua, L. J. Morales-Mendoza, M. Gonzalez-Lee, A. Diaz-Sanchez, D. Pereyra-Díaz, R. López-Martínez
Publikováno v:
Discrete Dynamics in Nature and Society, Vol 2015 (2015)
This paper proposes power series method (PSM) in order to find solutions for singular partial differential-algebraic equations (SPDAEs). We will solve three examples to show that PSM method can be used to search for analytical solutions of SPDAEs. Wh
Externí odkaz:
https://doaj.org/article/d1b8a09cbd694656a46a2742b794fc65
Autor:
U. Filobello-Nino, H. Vazquez-Leal, K. Boubaker, A. Sarmiento-Reyes, A. Perez-Sesma, A. Diaz-Sanchez, V. M. Jimenez-Fernandez, J. Cervantes-Perez, J. Sanchez-Orea, J. Huerta-Chua, L. J. Morales-Mendoza, M. Gonzalez-Lee, C. Hernandez-Mejia, F. J. Gonzalez-Martinez
Publikováno v:
Journal of Applied Mathematics, Vol 2015 (2015)
We propose an approximate solution of T-F equation, obtained by using the nonlinearities distribution homotopy perturbation method (NDHPM). Besides, we show a table of comparison, between this proposed approximate solution and a numerical of T-F, by
Externí odkaz:
https://doaj.org/article/af9b3fa888834f788a852b70e6b3e83c
Autor:
J. Sanchez Orea, U. Filobello Nino, K. Pereyra Castro, A. Perez Sesma, J. Cervantes Perez, A. Sarmiento Reyes, Brahim Benhammouda, V. M. Jimenez Fernandez, H. Vazquez Leal, A. Marin Hernandez, J. Huerta Chua
Publikováno v:
Applied Mathematics & Information Sciences. 11:1585-1595
Autor:
Hector Vazquez-Leal, Mario Gonzalez-Lee, F. Castro-Gonzalez, Arturo Sarmiento-Reyes, Victor Manuel Jimenez-Fernandez, A. Perez-Sesma, D. Pereyra-Diaz, J. Cervantes-Perez, Luis J. Morales-Mendoza, J. Huerta-Chua, Uriel Filobello-Nino
Publikováno v:
Applied Mathematical Modelling. 41:180-194
This paper presents a modified Laplace transform homotopy perturbation method with finite boundary conditions (MLT–HPM) designed to improve the accuracy of the approximate solutions obtained by LT–HPM and other methods. To this purpose, a suitabl
Autor:
Uriel Filobello-Nino, C. Hoyos-Reyes, J. Cervantes-Perez, A. Perez-Sesma, Agustín L. Herrera-May, Luis Hernandez-Martinez, Victor Manuel Jimenez-Fernandez, J. Huerta Chua, Antonio Marin-Hernandez, Hector Vazquez-Leal, Alejandro Diaz-Sanchez
Publikováno v:
Applied Mathematics & Information Sciences. 10:1355-1367
Autor:
J. Huerta-Chua, Hector Vazquez-Leal, Brahim Benhammouda, Arturo Sarmiento-Reyes, M. A. Sandoval-Hernandez, Victor Manuel Jimenez-Fernandez, Uriel Filobello-Nino, Luis J. Morales-Mendoza, A. Perez-Sesma, S. F. Hernandez-Machuca, J. M. Mendez-Perez, Mario Gonzalez-Lee, Yasir Khan
Publikováno v:
Neural Computing and Applications. 28:585-595
This article proposes the application of Laplace transform---homotopy perturbation method with variable coefficients, in order to find analytical approximate solutions for nonlinear differential equations with variable coefficients. As case study, we
Autor:
Yasir Khan, A. Perez-Sesma, J. Sanchez-Orea, Uriel Filobello-Nino, Victor Manuel Jimenez-Fernandez, Hector Vazquez-Leal, J. M. Mendez-Perez, Alejandro Diaz-Sanchez, Agustín L. Herrera-May, D. Pereyra-Diaz
Publikováno v:
Computational and Applied Mathematics. 34:1-16
This article proposes Laplace transform-homotopy perturbation method (LT-HPM) to solve nonlinear differential equations with Dirichlet, mixed, and Neumann boundary conditions. After comparing figures between approximate and exact solutions, we will s
Autor:
C. Hoyos-Reyes, Ahmet Yildirim, Hector Vazquez-Leal, A. Perez-Sesma, J. Sanchez-Orea, Uriel Filobello-Nino, D. Pereyra-Diaz, R. Castaneda-Sheissa
Publikováno v:
Applied Mathematics and Computation. 219:6707-6718
In this paper we study a generalization of the Johann Bernoulli's solution of the brachistocrone problem. We will see that his method can be quickly extended in such a way that it can be used to solve other problems in a similar way using just elemen