On Numerical Approximation of Stochastic Burgers' Equation

Alabert, Aureli; Gyongy, István

doi:10.1007/978-3-540-30788-4_1

Aureli Alabert⁴ &
István Gyongy⁵

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References

Da Prato, G., Debussche A. and Temam, R.: Stochastic Burgers equation. Non-linear Differential Equations and Applications 1, 389-402 (1994)
Article MATH MathSciNet Google Scholar
Da Prato, G. and Gatarek, D.: Stochastic Burgers equation with correlated noise. Stochastics and Stochastics Reports 52, 29-41 (1995)
MATH MathSciNet Google Scholar
Davie, A.M. and Gaines, J.G.: Convergence of numerical schemes for the solution of parabolic differential equations. Mathematics of Computation 70, 121-134 (2000)
Article MathSciNet Google Scholar
Gyöngy, I. and Krylov, N.V.: On stochastic equations with respect to semi-martingales I. Stochastics 4, 1-21 (1980)
MATH MathSciNet Google Scholar
Gyöngy, I.: Lattice approximations for stochastic quasi-linear parabolic differ-ential equations driven by space-time white noise I. Potential Analysis 9,1-25 (1998)
Article MATH MathSciNet Google Scholar
Gyöngy, I.: Lattice approximations for stochastic quasi-linear parabolic differ-ential equations driven by space-time white noise II. Potential Analysis 11, 1-37 (1999)
Article MATH MathSciNet Google Scholar
Gyöngy, I.: Existence and uniqueness results for semilinear stochastic partial differential equations. Stochastic Processes and their Applications 73, 271-299 (1988)
Article Google Scholar
Krylov, N. V. and Rozovskii, B.: Stochastic evolution equations. J. Soviet Math-ematics 16, 1233-1277 (1981)
Article MATH Google Scholar
Printems, J.: On discretization in time of parabolic stochastic partial differen-tial equations. Mathematical Modelling and Numerical Analysis 35, 1055-1078 (2001)
Article MATH MathSciNet Google Scholar
Walsh, J.B.: Finite element methods for parabolic stochastic PDE’s, to appear in Potential Analysis
Google Scholar
Yoo, H.: Semi-discretization of stochastic partial differential equations on R¹ by a finite-difference method. Mathematics of Computation 69, 653-666 (2000)
Article MATH MathSciNet Google Scholar

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Authors and Affiliations

Departament de Matemàtiques, Universitat Aut`onoma de Barcelona, 8193, Bellaterra, Catalonia, Spain
Aureli Alabert
School of Mathematics, University of Edinburgh, King's Buildings, EH9 3JZ, Edinburgh, UK
István Gyongy

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Aureli Alabert
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István Gyongy
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Alabert, A., Gyongy, I. (2006). On Numerical Approximation of Stochastic Burgers' Equation. In: From Stochastic Calculus to Mathematical Finance. Springer, Berlin, Heidelberg. https://doi.org/10.1007/978-3-540-30788-4_1

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DOI: https://doi.org/10.1007/978-3-540-30788-4_1
Publisher Name: Springer, Berlin, Heidelberg
Print ISBN: 978-3-540-30782-2
Online ISBN: 978-3-540-30788-4
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