Skip to main navigation Skip to main content Skip to page footer

Department of Physics

ΕΛΕ02

10ΕΛΕ02 Stochastic Processes in Physics

Course webpage:  https://eclass.uoa.gr/courses/PHYS246

Course outline

Course content

  • Introduction: Random variables, distributions, moments, moment generating function, Bayes theorem.
  • Estimation theory: Hypothesis testing, estimation of random variables.
  • Central limit theorem: Proof, Levy processes.
  • Discrete random walks: Fundamental equation, Polya theorem, mean number of distinct sites visited.
  • Diffusion equation: Properties, probability current, boundary conditions, first passage time calculation.
  • Brownian motion. It Itô-Stratonovich stochastic differential equations.
  • Fokker-Planck equation. Langevin equation.
  • Classical Caldeira-Leggett model.
  • Introduction to Brownian path integrals: Feynman-Kac formula (derivation, applications).