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Partial differential equations 2

Code: 45656
ECTS: 5.0
Lecturers in charge: prof. dr. sc. Nenad Antonić
Lecturers: Matko Grbac , mag. math. - Exercises
English level:


All teaching activities will be held in Croatian. However, foreign students in mixed groups will have the opportunity to attend additional office hours with the lecturer and teaching assistants in English to help master the course materials. Additionally, the lecturer will refer foreign students to the corresponding literature in English, as well as give them the possibility of taking the associated exams in English.

1. komponenta

Lecture typeTotal
Lectures 30
Exercises 15
* Load is given in academic hour (1 academic hour = 45 minutes)
COURSE AIMS AND OBJECTIVES: Introducing students to systems of partial differential equations, and further properties and modern solution techniques for partial differential equations.

[1-4] Elementary (fundamental) solutions, application of Fourier and Laplace transform, Malgrange-Ehrenprise theorem.
[5-8] Systems of equations, conservation laws.
[9-12] Variational theory for Poisson (elliptic) equation, symmetric hyperbolic systems.
  1. J. Rauch: Partial differential equations
  2. H. Brezis: Functional analysis, Sobolev spaces and partial differential equations
  3. S. Salsa: Partial differential equations in action: From modelling to theory
  4. N. Antonić, M. Vrdoljak: Mjera i integral
  5. L. C. Evans: Partial differential equations (2nd ed)
  6. L. Hörmander: Linear partial differential operator
  7. L. Tartar: An introduction to Sobolev spaces and interpolation spaces
  8. F. Treves: Basic linear partial differential equations
Prerequisit for:
Enrollment :
Attended : Partial differential equations 1

Examination :
Passed : Partial differential equations 1
2. semester
Mandatory course - Regular study - Applied Mathematics
Consultations schedule:
  • prof. dr. sc. Nenad Antonić:

    Monday 2-3 pm

    Tuesday noon-1pm

    or by appointment

    Location: 218


Link to the course web page: https://web.math.pmf.unizg.hr/~nenad/pdj.html