Multiscale stochastic homogenization of convection-diffusion equations |
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Authors: | Nils Svanstedt |
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Institution: | 1.Department of Mathematical Sciences,G?teborg University,G?teborg,Sweden |
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Abstract: | Multiscale stochastic homogenization is studied for convection-diffusion problems. More specifically, we consider the asymptotic
behaviour of a sequence of realizations of the form ∂u
ɛ
ω
/ ∂t+1 / ɛ
3
C(T
3(x/ɛ
3)ω
3) · ∇u
ɛ
ω
− div(α(T
2(x/ɛ
2)ω
2, t) ∇u
ɛ
ω
) = f. It is shown, under certain structure assumptions on the random vector field C(ω
3) and the random map α(ω
1, ω
2, t), that the sequence {u
ɛ
ω
} of solutions converges in the sense of G-convergence of parabolic operators to the solution u of the homogenized problem ∂u/∂t − div (B(t)∇u= f). |
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Keywords: | multiscale stochastic homogenization convection-diffusion |
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