Homogenization of the Poisson Equation in a Thick Periodic Junction

T. A. Mel'nyk

Abstract: A convergence theorem and asymptotic estimates as $\e \to 0$ are proved for a solution to a mixed boundary-value problem for the Poisson equation in a junction $\Omega_\e$ of a domain $\Omega_0$ and a large number $N^2$ of $\e$-periodically situated thin cylinders with thickness of order $\e = O({1 \over N})$. For this junction, we construct an extension operator and study its properties.

Keywords: homogenization, asymptotic estimates, extension operators

Classification (MSC2000): 35B27, 35B40, 35B25

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