This webpage collects information on the STINT Joint China-Sweden Mobility Numerical methods for stochastic partial differential equations CH2016-6729. This mobility program involves the following partners (with main participants in parentheses): Chinese Academy of Sciences (Jialin Hong, Zhou Tao), Central South University (Xiaojie Wang), Chalmers University of Technology and University of Gothenburg (Mihaly Kovacs, Annika Lang, Stig Larsson), and Umeå University (David Cohen).

### Informal kick-off meeting at the Chinese Academy of Sciences, Beijing May 27-28, 2017, Chinese Academy of Sciences, Beijing

In connection with the Forum on Scientific and Engineering Computing 2017.

### Mini-course on Numerical methods for SPDE: strong and weak convergence analysis November 06-10, 2017, Chinese Academy of Sciences, Beijing

This mini-course is given by Stig Larsson (Göteborg).
The mini-course presents a survey of methods for proving strong convergence and weak convergence of numerical methods for the stochastic heat and wave equations. Strong convergence refers to convergence with respect to a norm, for example, mean square convergence. Proofs typically involve representation of the error using the semigroup theory or energy estimates and using the Ito isometry or the Burkhold--Davies--Gundy inequality. Weak convergence involves the error in some functional of the solution. Proofs may involve representation of the weak error in terms of the Kolmogorov equation and may use integration by parts from the Malliavin calculus. The main part of the lectures will be concerned with the linear stochastic heat and wave equations. As an example of a more difficult problem, we will briefly discuss the stochastic Cahn--Hilliard equation.
Topics covered in this mini-course are:

• Stochastic integration in Hilbert space. Stochastic evolution problem in Hilbert space. Semigroup, mild solution. Stochastic heat equation. Stochastic wave equation.
• Numerical approximation by finite elements and Euler's method. Strong convergence.
• Weak convergence. Malliavin calculus.
• Stochastic Cahn--Hilliard equation.

This mini-course is organised by Jialin Hong and David Cohen within the framework Joint China-Sweden Mobility Grant of the Swedish Foundation for International Cooperation in Research and Higher Education STINT and the National Natural Science Foundation of China NSFC. We gratefully acknowledge its financial support.
We thank the Institute of Computational Mathematics at the Chinese Academy of Sciences (CAS) for the hospitality.
Further information can be found here.

And finally a picture from the classroom:

### Scientific event on numerical methods for stochastic partial differential equations June 11-15, 2018, Chalmers University of Technology and the University of Gothenburg, Gothenburg

We organise four sessions on numerical methods for stochastic (partial) differential equations in the 40th Conference on Stochastic Processes and their Applications SPA 2018. Invited speakers: Andrea Barth, Marc Schmidlin, Charles-Edouard Brehier, Lluis Quer-Sardanyons, Raphael Kruse, Andreas Neuenkirch, Michaela SzĂ¶lgyenyi, Lukasz Szpruch, Adam Andersson, Chuchu Chen, Liying Sun, Jialin Hong, Yanzhao Cao, Felix Lindner, Xu Wang, Jianbo Cui.

#### Contacts (Sweden)

David Cohen

Department of Mathematics and Mathematical Statistics
Umeå universitet
SE-90187 Umeå

Annika Lang

Department of Mathematical Sciences
Chalmers University of Technology
SE-412 96 Göteborg

Last modifications: 26.04.18