English

A splitting algorithm for stochastic partial differential equations driven by linear multiplicative noise

Probability 2018-06-18 v2

Abstract

We study the convergence of a Douglas-Rachford type splitting algorithm for the infinite dimensional stochastic differential equation dX+A(t)(X)dt=XdW\mboxin(0,T); X(0)=x,dX+A(t)(X)dt=X\,dW\mbox{ in }(0,T);\ X(0)=x, where A(t):VVA(t):V\to V' is a nonlinear, monotone, coercive and demicontinuous operator with sublinear growth and VV is a real Hilbert space with the dual VV'. VV is densely and continuously embedded in the Hilbert space HH and WW is an HH-valued Wiener process. The general case of a maximal monotone operators A(t):HHA(t):H\to H is also investigated.

Keywords

Cite

@article{arxiv.1612.01816,
  title  = {A splitting algorithm for stochastic partial differential equations driven by linear multiplicative noise},
  author = {Viorel Barbu and Michael Röckner},
  journal= {arXiv preprint arXiv:1612.01816},
  year   = {2018}
}

Comments

17 pages

R2 v1 2026-06-22T17:14:48.709Z