Explores statistical physics concepts like equiprobable microstates, entropy, and canonical ensembles, with applications in quantum mechanics and semiconductor physics.
Explores sampling the canonical ensemble, temperature fluctuations, extended Lagrangian, and Maxwell-Boltzmann distribution in molecular dynamics simulations.
Covers the derivation of path integral estimators for momentum-dependent operators and discusses improvements for statistical convergence in multi-particle systems.
Covers the postulates of Quantum Mechanics, the double-slit experiment, and the path integral formulation's significance in understanding quantum phenomena.
Explores the statistical mechanics of liquids, covering challenges in modeling, reduced distribution functions, pair correlation function, and scattering.
