Diffusive systems respecting the fluctuation-dissipation theorem with multiplicative noise are studied on the level of stochastic differential equations. We propose an efficient simulation scheme motivated by the direct definition of the `Kinetic stochastic integral', which differs from the better known Itô and the Stratonovich integrals. This simulation scheme is based on introducing the identity matrix, expressed in terms of the diffusion tensor and its inverse, in front of the noise term, and evaluating these factors at different times. for LaTeX users @article{MH\"utter1998-94, author = {M. H\"utter and H. C. \"Ottinger}, title = {Fluctuation-Dissipation Theorem, Kinetic Stochastic Integral, and Efficient Simulations}, journal = {J. Chem. Soc. Faraday Trans.}, volume = {94}, pages = {1403-1406}, year = {1998} }
\bibitem{MH\"utter1998-94} M. H\"utter, H.C. \"Ottinger, Fluctuation-Dissipation Theorem, Kinetic Stochastic Integral, and Efficient Simulations, J. Chem. Soc. Faraday Trans. {\bf 94} (1998) 1403-1406.MH\"utter1998-94 M. H\"utter, H.C. \"Ottinger Fluctuation-Dissipation Theorem, Kinetic Stochastic Integral, and Efficient Simulations J. Chem. Soc. Faraday Trans.,94,1998,1403-1406 |