Asymptotic of solutions of the Neumann problem in a domain with closely posed components of the boundary
Résumé
The Neumann problem for the Poisson equation is considered in a domain $\Omega_{\varepsilon}\subset\mathbb{R}^{n}$ with boundary components posed at a small distance $\varepsilon>0$ so that in the limit, as $\varepsilon \rightarrow0^{+},$ the components touch each other at the point $\mathcal{O}$ with the tangency exponent $2m\geq2$. Asymptotics of the solution $u_{\varepsilon}$ and the Dirichlet integral $\Vert\nabla_{x}u_{\varepsilon };L^{2}(\Omega_{\varepsilon})\Vert^{2}$ are evaluated and it is shown that main asymptotic term of $u_{\varepsilon}$ and the existence of the finite limit of the integral depend on the relation between the spatial dimension $n$ and the exponent $2m$. For example, in the case $n<2m-1$ the main asymptotic term becomes of the boundary layer type and the Dirichlet integral has no finite limit. Some generalization are discussed and certain unsolved problems are formulated, in particular, non-integer exponents $2m$ and tangency of the boundary components along smooth curves.
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