SPECIAL FUNCTIONS FOR
PHYSICISTS (3 - 0)
CONTENTS:
Differential
equations of physics and the method of separation
of variables; Legendre polynomials; associated
Legendre polynomials; Laguerre polynomials;
Hermite polynomials; Bessel functions; Gauss
hypergeometric functions; Sturm-Liouville theory.
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)
- HILDEBRAND FB,
Advanced Calculus for Applications, Prentice-Hall
Inc. (1976)
- ANDREWS
LC, Special Functions of Mathematics for
Engineers, Second Edition (1997)
- TAI
L. CHOW, Mathematical Methods for Physicists : A
Concise Introduction, Cambridge University
Press (2000)
COURSE
SCHEDULE: Vote for New
Schedule
https://doodle.com/poll/9wcqqtsc3asvqfs2
- Tuesday 12:40
- 14:30 @P350
- Thursday 14:40 -
16:30 @P350
EXAMINATIONS:
- 1st
Midterm Exam: March 5, 2020
14.40 - 16.30
- 2nd
Midterm Exam: April 9,
2020 14.40 - 16.30
- Final Exam:
- MAKE-UP Exam :
COURSE STUDENT LIST
|