Averaging principle for one dimensional stochastic Burgers equation

In this paper, we consider the averaging principle for one dimensional stochastic Burgers equation with slow and fast time-scales. Under some suitable conditions, we show that the slow component strongly converges to the solution of the corresponding averaged equation. Meanwhile, when there is no noise in the slow component equation, we also prove that the slow component weakly converges to the solution of the corresponding averaged equation with the order of convergence $1-r$, for any $0

[1]  A. Veretennikov,et al.  On Large Deviations in the Averaging Principle for SDEs with a “Full Dependence” , 1999 .

[2]  Charles-Edouard Bréhier,et al.  Strong and weak orders in averaging for SPDEs , 2012 .

[3]  J. Gillis,et al.  Asymptotic Methods in the Theory of Non‐Linear Oscillations , 1963 .

[4]  Zhao Dong,et al.  One-dimensional stochastic Burgers equation driven by Lévy processes , 2007 .

[5]  REPRESENTATION OF PATHWISE STATIONARY SOLUTIONS OF STOCHASTIC BURGERS' EQUATIONS , 2009 .

[6]  G. Yin,et al.  Approximate method for stochastic chemical kinetics with two-time scales by chemical Langevin equations. , 2016, The Journal of chemical physics.

[7]  Pathwise stationary solutions of stochastic Burgers equations with $L^2[0,1]$-noise and stochastic Burgers integral equations on infinite horizon , 2006, math/0609344.

[8]  E Weinan,et al.  Multi-scale Modeling and Computation , 2003 .

[9]  Herbert A. Simon,et al.  Aggregation of Variables in Dynamic Systems , 1961 .

[10]  Paulo R. Ruffino,et al.  An averaging principle for diffusions in foliated spaces , 2012, 1212.1587.

[11]  Xue-Mei Li An averaging principle for a completely integrable stochastic Hamiltonian system , 2008, 2110.03817.

[12]  A. J. Roberts,et al.  Partial Differential Equations , 2009 .

[13]  J. Zabczyk,et al.  Ergodicity for Infinite Dimensional Systems: Invariant measures for stochastic evolution equations , 1996 .

[14]  A. Truman,et al.  Stochastic Burgers' Equations and Their Semi-Classical Expansions , 1998 .

[15]  Eric L Haseltine,et al.  Two classes of quasi-steady-state model reductions for stochastic kinetics. , 2007, The Journal of chemical physics.

[16]  Katharina Krischer,et al.  Oscillatory CO oxidation on Pt(110) : modeling of temporal self-organization , 1992 .

[17]  Vivien Kirk,et al.  Multiple Timescales, Mixed Mode Oscillations and Canards in Models of Intracellular Calcium Dynamics , 2011, J. Nonlinear Sci..

[18]  Mark Freidlin,et al.  Averaging principle for a class of stochastic reaction–diffusion equations , 2008, 0805.0297.

[19]  George Yin,et al.  Limit behavior of two-time-scale diffusions revisited , 2005 .

[20]  E Weinan,et al.  Invariant measures for Burgers equation with stochastic forcing , 2000, math/0005306.

[21]  Jicheng Liu,et al.  Strong convergence rate in averaging principle for stochastic FitzHugh–Nagumo system with two time-scales , 2014 .

[22]  Jonathan C. Mattingly Ergodicity of 2D Navier–Stokes Equations with¶Random Forcing and Large Viscosity , 1999 .

[23]  E. Vanden-Eijnden,et al.  Analysis of multiscale methods for stochastic differential equations , 2005 .

[24]  J. Zabczyk,et al.  Stochastic Equations in Infinite Dimensions , 2008 .

[25]  Yves Tessier,et al.  Mixed-mode oscillations in complex-plasma instabilities. , 2008, Physical review letters.

[26]  On stochastic diffusion equations and stochastic Burgers’ equations , 1996 .

[27]  Richard Bertram,et al.  Multi-timescale systems and fast-slow analysis. , 2017, Mathematical biosciences.

[28]  Roger Temam,et al.  Stochastic Burgers' equation , 1994 .

[29]  Jicheng Liu,et al.  Strong convergence rate in averaging principle for stochastic hyperbolic-parabolic equations with two time-scales , 2015, 1611.09080.

[30]  A. Truman,et al.  STOCHASTIC BURGERS EQUATION WITH LÉVY SPACE-TIME WHITE NOISE , 2003 .

[31]  Linbao Zhang Multi-scale modeling and computations , 2009 .

[32]  A. Debussche,et al.  m-Dissipativity of Kolmogorov Operators Corresponding to Burgers Equations with Space-time White Noise , 2007 .

[33]  A. Roberts,et al.  Large deviations and approximations for slow–fast stochastic reaction–diffusion equations , 2012 .

[34]  Fast flow asymptotics for stochastic incompressible viscous fluids in R 2 and SPDEs on graphs , 2016 .

[35]  M. Freidlin,et al.  Random Perturbations of Dynamical Systems , 1984 .

[36]  Jicheng Liu,et al.  Strong convergence in stochastic averaging principle for two time-scales stochastic partial differential equations☆ , 2011 .

[37]  Sandra Cerrai,et al.  A Khasminskii type averaging principle for stochastic reaction–diffusion equations , 2008, 0805.0294.