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The
objective of this course is to introduce the
undergraduate students to advanced mathematical
analysis with emphasis on mathematical methods used
for the solutions of problems in some areas of
theoretical physics and the partial differential and
integral equations which describe them.
CONTENTS:
- Series
- Integral
transforms
- Integral
equations
- Green's
functions
- Calculus of
variations
REFERENCES:
- ARFKEN G and
WEBER H, Mathematical Methods of Physics, Academic
Press (1995)
- BOAS ML,
Mathematical Methods in the Physical Sciences, John
Wiley & Sons (1983)
- BUTKOV E,
Mathematical Physics, Addison-Wesley Pub.Co., NY
(1968)
- JERRI AJ ,
Introduction to Integral Equations with Applications
, John Wiley & Sons (1999)
- HILDEBRAND FB,
Methods of Applied Mathematics, Prentice-Hall Inc.
(1965)
- TAI
L. CHOW, Mathematical Methods for Physicists : A
Concise Introduction, Cambridge University
Press (2000)
- KANWAL
RP, Linear Integral Equations, Birkhäuser,
New York, NY (2013)
COURSE
SCHEDULE:
- Tuesday 9:00 - 10:30
@ P422
- Wednesday 9:00 - 10:30 @ P422
EXAMINATIONS:
- 1st Midterm Exam: October 30, 2019
- 2nd Midterm Exam: November 27, 2019
- Final
Exam: January -, 2020
- MAKE -UP
Exam : -
LEARNING
OUTCOMES:
At the end of the course unit, the learner is expected
to be able to solve simple boundary and initial value
problems by the use of Green’s function, integral
equation and integral transform methods.
COURSE STUDENT LIST
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