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HU Credits:
6
Degree/Cycle:
1st degree (Bachelor)
Responsible Department:
Physics
Semester:
1st Semester
Teaching Languages:
Hebrew
Campus:
E. Safra
Course/Module Coordinator:
Dr. Michael Moshe
Coordinator Office Hours:
will be set in the first week of class
Teaching Staff:
Dr. Michael Moshe
Mr. Ohad Vilk
Mr. Daniel Cohen
Course/Module description:
Methods of Mathematical Physics
Course/Module aims:
To teach the students advanced mathematical methods which are extensively used in physics and other sciences
Learning outcomes - On successful completion of this module, students should be able to:
master advanced mathematical methods which will help them in physics courses
Attendance requirements(%):
0
Teaching arrangement and method of instruction:
lectures, recitations by teaching assistants and home assignements
Course/Module Content:
Vector analysis in curvilinear coordinates. An introduction to generalized functions. The boundary value
problem and the Sturm-Liouville theory. The Green function. Partial differential equations
(PDEs) of first order: the method of characteristics. PDEs of the second order: classification and
canonical forms. Cauchy, Dirichlet and Neumann problems. The wave equation: the d’Alembert’s
formula, vibrating string, vibrating membrane. The heat equation. The Laplace equation. Inhomogeneous
problems. An intro to variational calculus. An intro to integral
equations.
Required Reading:
None
Additional Reading Material:
1. G.B. Arfken. Mathematical Methods for Physicists.
2. K.F. Riley, M.P. Hobson, and S.J. Bence. Mathematical Methods for Physics and Engineering.
3. J. Mathews and R.L. Walker. Mathematical Methods of Physics.
4. M.L. Boas. Mathematical Methods in the Physical Sciences.
Course/Module evaluation:
End of year written/oral examination 90 %
Presentation 0 %
Participation in Tutorials 0 %
Project work 0 %
Assignments 10 %
Reports 0 %
Research project 0 %
Quizzes 0 %
Other 0 %
Additional information:
None
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