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References
Barth A, Lang A (2012) Simulation of stochastic partial differential equations using finite element methods. Stochastics 84(2–3):217–231
Braess D (2007) Finite elements. Theory, fast solvers and applications in elasticity theory (Finite Elemente. Theorie, schnelle Löser und Anwendungen in der Elastizitätstheorie.) 4th rev and extended edn. Springer, Berlin
Chow P-L (2007) Stochastic partial differential equations. Applied mathematics and nonlinear science series. Chapman & Hall/CRC, Boca Raton
Dautray R, Lions J-L (2000) Mathematical analysis and numerical methods for science and technology. Springer, Berlin
Dellacherie C, Meyer P-A (1978) Probabilities and potential (Transl. from the French.) North-Holland mathematics studies, vol 29. North-Holland, Amsterdam/New York/Oxford
Da Prato G, Zabczyk J (1992) Stochastic equations in infinite dimensions. Encyclopedia of mathematics and its applications, vol 44. Cambridge University Press, Cambridge
Fishman GS (1996) Monte Carlo. Concepts, algorithms, and applications. Springer, New York
Holden H, Øksendal B, Ubøe J, Zhang T (2010) Stochastic partial differential equations. A modeling, white noise functional approach. Universitext, 2nd edn. Springer, New York
Ikeda N, Watanabe S (1989) Stochastic differential equations and diffusion processes. North-Holland mathematical library, 2nd edn., vol 24. North-Holland, Amsterdam/Kodansha, Tokyo
Juan O, Keriven R, Postelnicu G (2006) Stochastic motion and the level set method in computer vision: stochastic active contours. Int J Comput Vis 69(1):7–25
Kloeden PE, Platen E (1992) Numerical solution of stochastic differential equations. Applications of mathematics, vol 23. Springer, Berlin
. Lang A (2007) Simulation of stochastic partial differential equations and stochastic active contours. PhD thesis, Universität Mannheim
Lions P-L, Souganidis PE (1998) Fully nonlinear stochastic partial differential equations. C R Acad Sci Paris Sér I Math 326(9):1085–1092
Métivier M (1982) Semimartingales: a course on stochastic processes. de Gruyter studies in mathematics, vol 2. Walter de Gruyter, Berlin/New York
Øksendal B (2003) Stochastic differential equations. An introduction with applications. Universitext, 6th edn. Springer, Berlin
Pardoux E (1979) Stochastic partial differential equations and filtering of diffusion processes. Stochastics 3:127–167
Peszat S, Zabczyk J (2007) Stochastic partial differential equations with lévy noise. An evolution equation approach. Encyclopedia of mathematics and its applications, vol 113. Cambridge University Press, Cambridge
Prévôt C, Röckner M (2007) A concise course on stochastic partial differential equations. Lecture notes in mathematics, vol 1905. Springer, Berlin
Protter PE (2004) Stochastic integration and differential equations. Applications of mathematics, 2nd edn., vol 21. Springer, Berlin
Walsh JB (1986) An introduction to stochastic partial differential equations (École d'été de probabilités de Saint-Flour XIV - 1984.) Lect Notes Math 1180:265–437
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Lang, A. (2014). Stochastic Partial Differential Equations. In: Ikeuchi, K. (eds) Computer Vision. Springer, Boston, MA. https://doi.org/10.1007/978-0-387-31439-6_681
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