"Babes-Bolyai" University of Cluj-Napoca
Faculty of Mathematics and Computer Science
| Partial Differential Equations (2) |
ter |
||||
| Teaching Staff in Charge |
Prof. TRIF Damian, Ph.D., dtrif math.ubbcluj.roProf. PRECUP Radu, Ph.D., r.precup math.ubbcluj.roAssoc.Prof. BEGE Antal, Ph.D., bege math.ubbcluj.ro |
| Aims |
|
Improvement of the working methods in Sobolev spaces in view of
the study of nonlinear boundary value problems. |
| Content |
|
Distributions; Sobolev spaces; Fourier transform;First order partial differential equations; Generalized solutions
to elliptic problems; Regularity results. Maximum principles. Eigenvalues and eigenfunctions. Introduction to potential theory. |
| References |
|
1. ADAMS, R.A., Sobolev spaces, Academic Press, 1975.
2. BARBU, V., Probleme la limita pentru ecuatii cu derivate partiale, Ed. Acad. Române, Bucuresti, 1993. 3. DEBNAT, L., Non-linear partial differential equations for scientists and engineers, Birkhauser, Berlin, 1997. 4. GILBARG, D., TRUDINGER, N.S., Elliptic partial differential equations of second order, Springer, Berlin, 1983. 5. O'REGAN, D., PRECUP, R., Theorems of Leray-Schauder Type and Applications, Gordon and Breach, Amsterdam, 2001. 6. PRECUP, R., Lectii de ecuatii cu derivate partiale, Presa Universitara Clujeana, 2004. 7. RAUCH, J., Partial differential equations, Springer, Berlin, 1991. 8. SZILAGYI P., Másodrendu parciális differenciálegyenletek, BBTE, Kolozsvár, 1998. 9. VLADIMIROV, V.S., Ecuatiile fizicii matematice, Ed. St. Enc., Bucuresti, 1981 (Bevezetés a parciális differenciálegyenletek elméletébe, Muszaki Kiadó, Budapest, 1980). 10. TRIF, D., Ecuatii cu derivate partiale, UBB, Cluj, 1993. |
| Assessment |
|
Midterm exam 30%
Final written exam 70%. |
| Links: | Syllabus for all subjects Romanian version for this subject Rtf format for this subject |