Martin Hairer
Published 2009-07-23, updated 2023-07-03Version 2
These notes are based on a series of lectures given first at the University of Warwick in spring 2008 and then at the Courant Institute, Imperial College London, and EPFL. It is an attempt to give a reasonably self-contained presentation of the basic theory of stochastic partial differential equations, taking for granted basic measure theory, functional analysis and probability theory, but nothing else. The approach taken in these notes is to focus on semilinear parabolic problems driven by additive noise. These can be treated as stochastic evolution equations in some infinite-dimensional Banach or Hilbert space that usually have nice regularising properties and they already form a very rich class of problems with many interesting properties. Furthermore, this class of problems has the advantage of allowing to completely pass under silence many subtle problems arising from stochastic integration in infinite-dimensional spaces.
Comments: Many small fixes. Includes a new section on probability measures on Polish spaces
Hörmander's theorem for stochastic partial differential equations
A lattice scheme for stochastic partial differential equations of elliptic type in dimension $d\ge 4$
A new approach to stochastic evolution equations with adapted drift
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