PH4213 : Symmetry Methods in Physics (Spring 2021) | Academic Portal of IISER Kolkata

Details of PH4213 (Spring 2021)

Level: 4

Type: Theory

Credits: 4.0

Course Code	Course Name	Instructor(s)
PH4213	Symmetry Methods in Physics	Ananda Dasgupta

Syllabus
1. Basics of group theory: recapitulation of basic definitions. Normal subgroups and quotient groups. Isomorphism theorems. Direct and semi-direct product of groups. 2. Representation theory: linear and matrix representations. Function space representations. The regular representation. Unitary representations. Reducible and irreducible representations. Schurs lemmas. The Great Orthogonality Theorem. Orthogonality of character vectors. Irreducibility criterion. Reduction of representations. Projection operators. Wigner-Eckart theorem. 3. Continuous groups: SO(3) and SU(2). The connection between Lie Groups and Lie algebras. The representation theory of semi-simple Lie algebras. Roots and weights. Dynkin diagrams. 4. Representation theory of the symmetric group. Young tableaux. Their applications to the representations of SU(N). 5. Applications to various physical systems. These may include molecular vibrations, crystal field effects, identical particles, the quark model etc.

Syllabus

1. Basics of group theory: recapitulation of basic definitions. Normal subgroups and quotient groups. Isomorphism theorems. Direct and semi-direct product of groups.

2. Representation theory: linear and matrix representations. Function space representations. The regular representation. Unitary representations. Reducible and irreducible representations. Schurs lemmas. The Great Orthogonality Theorem. Orthogonality of character vectors. Irreducibility criterion. Reduction of representations. Projection operators. Wigner-Eckart theorem.

3. Continuous groups: SO(3) and SU(2). The connection between Lie Groups and Lie algebras. The representation theory of semi-simple Lie algebras. Roots and weights. Dynkin diagrams.

4. Representation theory of the symmetric group. Young tableaux. Their applications to the representations of SU(N).

5. Applications to various physical systems. These may include molecular vibrations, crystal field effects, identical particles, the quark model etc.

Prerequisite
Linear algebra and basics of group theory. Acquaintance with quantum mechanics (at the third year level) desirable.

References
Recommended books: 1. Thomas Wolfram, Sinasi Ellialtioglu - Applications of group theory to atoms, molecules, and solids , Cambridge University Press, 2014 2. J. P. Elliott and P. G. Dawber Symmetry in physics Vols. 1 and 2, McMillan Press 1979 3. Mildred S. Dresselhaus, Gene Dresselhaus, and Ado Jorio Group theory : Application to the Physics of Condensed Matter, Springer-Verlag, 2008 4. Pierre Ramond - Group Theory: A Physicist's Survey, Cambridge University Press, 2010

References

Recommended books:
1. Thomas Wolfram, Sinasi Ellialtioglu - Applications of group theory to atoms, molecules, and solids , Cambridge University Press, 2014
2. J. P. Elliott and P. G. Dawber Symmetry in physics Vols. 1 and 2, McMillan Press 1979
3. Mildred S. Dresselhaus, Gene Dresselhaus, and Ado Jorio Group theory : Application to the Physics of Condensed Matter, Springer-Verlag, 2008
4. Pierre Ramond - Group Theory: A Physicist's Survey, Cambridge University Press, 2010

Course Credit Options

Sl. No.	Programme	Semester No	Course Choice
1	IP	2	Not Allowed
2	IP	4	Elective
3	IP	6	Not Allowed
4	MR	2	Not Allowed
5	MR	4	Elective
6	MS	10	Not Allowed
7	MS	4	Not Allowed
8	MS	6	Not Allowed
9	MS	8	Elective
10	RS	1	Elective
11	RS	2	Elective

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Details of PH4213 (Spring 2021)

Course Credit Options