Videos

Homogenization for SDEs

Presenter
April 4, 2007
Keywords:
  • multi-scale analysis
  • ODE and PDE
  • SDE (stochastic differential equations)
  • perturbations of PDEs
  • perturbation theory
  • singular perturbations
  • homogenization of PDEs
  • homogenization and averaging, stochastic analysis
  • renormalization methods in analysis
  • centering equation
  • Fredholm alternative
  • backward Kolgomorov equation
  • effective Hamiltonians, renormalization
  • effective drift and diffusion
MSC:
  • 81T15
  • 34D10
  • 34D35
  • 34D15
  • 34Dxx
  • 34Lxx
  • 34-xx
  • 35-xx
  • 37A50
  • 37Hxx
  • 37H10
  • 37F25
  • 45Bxx
  • 45B05
Abstract
The course provides an introduction to the theory of multiscale methods, and the techniques of averaging and homogenization in particular. The theory will be exemplified by application to ordinary and stochastic differential equations, Markov chains and partial differential equations. The course will comprise 10 introductory lectures on averaging and homogenization by G.A. Pavliotis (Imperial, on partial differential equations) and by A.M. Stuart (Warwick, on stochastic processes). There will also be several guest lectures by experts in multiscale phenomena. These will cover applications and theory. The course is aimed primarily at graduate students from mathematics and statistics, but will also be of interest to students working in closely allied areas of engineering and physics. Furthermore, postdoctoral and young researchers are also encouraged to attend.
Supplementary Materials