Profesor | Lucía Medina Gómez | lu a vi | 10 a 11 |
Profesor | Francisco Ricardo Torres Arvizu | ||
Ayudante | David Hernández Obin | ||
Ayudante | Víctor Sebastián Razo Morales |
Temario
1 Repaso
1.1 Solución Ecuaciones Diferenciales Método de Series
1.2 Ecuaciones Diferenciales Parciales: separación de Variables
2. Operador de Sturm Liouville y funciones especiales (2 exámenes tarea, 50%)
2.1 Fourier
2.2 Bessel
2.3 Legendre y otras funciones
3. Transformaciones Integrales (1 examen tarea, 25%)
3.1 Fourier
3.2 Laplace
4. Funciones de Green (1 examen tarea, 25%)
Modalidad: Lu Mi Vi clases síncronas
Ma Ju clases asíncronas.
Todas las clases síncronas se grabarán y compartirán con el grupo
La liga del curso: https://meet.google.com/lookup/c4oonaat5r
Material: será compartido en classroom Código de la clase: vlv2w7q
Bibliografía
Appel W. Mathematics for physicists. USA: Princeton University Press; 2007.
Marsden J. E., Hoffman M. I., Basic complex analysis, 3rd Ed., W. H. Freeman and Company, 1998.
Asmar N. H., Applied Complex Analysis with Partial Differential Equations, Prentice-Hall, Inc., 2002.
Brown J. W., Churchill R. V., Complex variables and applications, 8th Ed., McGraw-Hill Higher Education, 2009.
Arfken BA, Weber HJ, Harris FE. Mathematical methods for physicists, a comprehensive guide. 6th ed. USA: Academic Press; 2012.
Asmar NH. Partial differential equations with Fourier series and boundary value problems. USA: Pearson Education; 2005.
Haberman R. Applied partial differential equations with Fourier series and boundary value problems. USA: Pearson Education; 2012.
McQuarrie DA. Mathematical methods for scientists and engineers. USA: University Science Books; 2003.
Weinberger HF. A first course in partial differential equations, with complex variables and transform methods. USA: Dover; 1995.