Syllabus

Formalism of quantum mechanics: Hilbert space and wave function, Dirac notation,operators, operator representation in discrete and continuous basis, matrix representation,postulates of quantum mechanics: basic postulates of quantum mechanics, observablesand operators, commutation relations and commutating observables, measurements inquantum mechanics, time evolution of system, symmetry and conservation laws,Schrödinger equation: time dependent and time independent Schroedinger equation,application to one dimensional harmonic oscillator. Schrödinger, Heisenberg andinteraction pictures. Angular momentum: general formalism of angular momentum, Orbitalangular momentum and its eigenfunctions, Spin angular momentum, experimentalevidence of spin, Pauli matrices, application to three dimensional problems (Central potential)

Get familiar with formulation of Quantum Mechanics through linear algebra and matrix algebra.

Solving problems in Quantum Mechanics and getting a clear idea of eigenenergies and eigenfunctions.

Solving problems in more than one dimension and multi-particle systems.

The students will get familiar with solving problems in Quantum Mechanics through DIrac's bra and ket notations.

N. Zettil, Quantum Mechanics: Concepts and Applications, Wiley, 2nd Edition (2009)

C. Cohen-Tannoudji, Quantum Mechanics (vol.1), John Willey & sons, 2005

D. J. Griffith, Introduction to Quantum Mechanics, Pearson, 2nd Edition (2007

R. Shankar, Principles of Quantum Mechanics, Plenum Publishers, 2nd Edition (1994)