Stochastic homogenization
Abstract
We are interested in linear elliptic differential equations (including the case of systems) with random coefficient fields. Provided the underlying probability measure on the space of coefficient fields is shift invariant and ergodic, the solution operator acts on large scales like the solution operator of an elliptic equation with deterministic and spatially homogeneous coefficients; a phenomenon called homogenization. We are interested in quantitative aspects of this phenomenon. It turns out that this is intimately linked to elliptic regularity theory; in fact, the above type of randomness generates a large-scale regularity theory as for instance encoded in Liouville properties.
Date and time info
Tuesday 09:15 - 11:00
Keywords
linear elliptic differential equations with random coefficient fields, elliptic regularity theory
Prerequisites
Some knowledge in elliptic PDE is helpful, practically no knowledge in Probability theory
Audience
MSc students, PhD students, Postdocs
Language
English