A note on asymptotic expansion for a periodic boundary condition

Ján Filo

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Existence and uniqueness of periodic solutions for a model of contaminant flow in porous medium.

Badii, Maurizio (2003)

Rendiconti del Seminario Matematico

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Γ-convergence approach to variational problems in perforated domains with Fourier boundary conditions

Valeria Chiadò Piat, Andrey Piatnitski (2010)

ESAIM: Control, Optimisation and Calculus of Variations

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The work focuses on the Γ-convergence problem and the convergence of minimizers for a functional defined in a periodic perforated medium and combining the bulk (volume distributed) energy and the surface energy distributed on the perforation boundary. It is assumed that the mean value of surface energy at each level set of test function is equal to zero. Under natural coercivity and -growth assumptions on the bulk energy, and the assumption that the surface energy satisfies -growth...

Multiscale convergence and reiterated homogenization of parabolic problems

Anders Holmbom, Nils Svanstedt, Niklas Wellander (2005)

Applications of Mathematics

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Reiterated homogenization is studied for divergence structure parabolic problems of the form $\partial u_{ε} / \partial t - div (a (x, x / ε, x / ε^{2}, t, t / ε^{k}) \nabla u_{ε}) = f$ . It is shown that under standard assumptions on the function $a (x, y_{1}, y_{2}, t, τ)$ the sequence ${u_{ϵ}}$ of solutions converges weakly in $L^{2} (0, T; H_{0}^{1} (Ω))$ to the solution $u$ of the homogenized problem $\partial u / \partial t - div (b (x, t) \nabla u) = f$ .

Homogenization of evolution problems for a composite medium with very small and heavy inclusions

Michel Bellieud (2005)

ESAIM: Control, Optimisation and Calculus of Variations

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We study the homogenization of parabolic or hyperbolic equations like $ρ_{ε} \frac{\partial^{n} u_{ε}}{\partial t^{n}} - div (a_{ε} \nabla u_{ε}) = f in Ω \times (0, T) + boundary conditions, n \in {1, 2},$ when the coefficients $ρ_{ε}$ , $a_{ε}$ (defined in $Ø$ ) take possibly high values on a $ε$ -periodic set of grain-like inclusions of vanishing measure. Memory effects arise in the limit problem.

Large diffusivity finite-dimensional asymptotic behaviour of a semilinear wave equation.

Willie, Robert (2003)

Journal of Applied Mathematics

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