Inhalt des Dokuments
Nonlinear Stochastic Evolution Equations:
Analysis and Numerics 
November 3rd - 5th, 2016, Berlin
Raphael Kruse 
Etienne Emmrich 
Petra Wittbold 
Supported by Technische Universität Berlin, Universität Duisburg-Essen, Einstein Center for Mathematics and German Research Foundation through DFG research unit FOR 2402.
Since the 1970s the
analysis of stochastic partial differential equations (SPDEs) is one
of the most active research fields within mathematics, which has led
to many new and fruitful collaborations of several mathematical
branches such as differential equations, stochastic analysis,
numerics or functional analysis. Nowadays, SPDEs are often used to
model complex phenomena, which are influenced by uncertainties or
stochastic perturbations. Typically, the presence of noise leads to a
loss of regularity which prevents the application of traditional
(deterministic) solution theory or approximation methods.
The goal of this workshop is to discuss open problems and recent progress made in the mathematical treatment of nonlinear stochastic evolution equations. For instance, in the case of quasilinear stochastic evolution equations, such as the stochastic p-Laplace equation, the question of existence of solutions can often be positively answered by the help of variational methods. However, it often remains an open problem of how to determine the optimal regularity of such a solution. Moreover, the development and analysis of numerical methods for such equations is still in its infancy.