Physics – Mathematical Physics
Scientific paper
1996-02-02
Ann. Inst. H. Poincare 65 (1996), 109-123
Physics
Mathematical Physics
LaTeX file, 12 pages, no figures
Scientific paper
Consider the Laplacian in a straight planar strip of width $\,d\,$, with the Neumann boundary condition at a segment of length $\,2a\,$ of one of the boundaries, and Dirichlet otherwise. For small enough $\,a\,$ this operator has a single eigenvalue $\,\epsilon(a)\,$; we show that there are positive $\,c_1,c_2\,$ such that $\,-c_1 a^4 \le \epsilon(a)- \left(\pi/ d\right)^2 \le -c_2 a^4\,$. An analogous conclusion holds for a pair of Dirichlet strips, of generally different widths, with a window of length $\,2a\,$ in the common boundary.
Exner Pavel
Vugalter Semjon A.
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