The course consists of four sections after an introductory lecture on many particle systems.

The reference to specific chapters of the textbooks is given in each section.

Quantum Mechanics of  Many Particles Systems

((G), chapter 13)

Identical particles: Fermions and Bosons, Slater determinant for independent particles, Pauli exclusion principle.

Statistical Physics

((KK) chapters 2, 3, 6-9 or equivalently (T) chapters 1, 2.1-2.4, 3.4-3.5.3, 3.6.1-3.6.3 or (M) chapter 4)

• Entropy, temperature and probability.
  
• Canonical ensemble and the Boltzmann distribution.
  
• Ideal classical gas.
  
• Chemical potential, gran canonical ensemble and the Gibbs distribution.
  
• Quantum distributions functions: Fermi-Dirac and Bose-Einstein distributions.
  
• Degenerate Fermi gas: Fermi energy,  specific heat.
  
• Low temperature Bose gas and the Bose-Einstein condensation, superfluid Helium.
  

Atomic physics

((G) chapter 14 with supplements 14-A and 14-B, (BJ) chapters 7 and 8)

• Two-electrons atoms: perturbation theory and variational principle for the ground state.
  
• Exited states of two-electrons atoms: parahelium and orthoelium.
  
• Many-electron atoms in the Hartree theory.
  
• Ground state of  many-electron atoms and the periodic system of the elements.
  
• Corrections to the central field approximation: L-S and j-j couplings, Hund's rules.
  

Molecular Physics

((M) chapter 3, (BJ)  chapters 10 and 11)

• The  Born-Oppheneimer approximation. 
  
• The electronic structure of the H₂ molecule: the Heitler-London and the molecular orbital schemes.  
  
• Electronic states in homo- and hetero-nuclear diatomic molecules, covalent and ionic bonding.  
  
• Electronic states in polyatomic molecules: hybridization and the Hueckel model. 
  
• Rotations and vibrations of  diatomic molecules.  
  
• Raman and IR spectra of the diatomic molecule. IR selection rules in the electric dipole approximation.  
  
• The effects of the nuclear spin on the rotation of the homonuclear diatomic molecules.
  
• Specific heat of polyatomic molecules. The theorem of equipartition of energy.
  

Solid State Physics

((M) chapter  5) 

• Lattices and crystal structures.
  
• Diffraction experiments and the reciprocal lattice.
  
• The band theory of electrons in crystals: metals and insulators.
  
• Semiclassical dynamics of electrons in crystals and the electrical conductivity of metals.
  
• Semiconductors:  distribution of electrons and holes in intrinsic semiconductors,  n and p doping, acceptor and donor states in the hydrogenic model.
  
• Semiconductor devices: the pn junction.
  
• The laser. ((M),  section 4.4.1)