Eigenvalue falls in thin broken quantum strips

We are interesting in the spectrum of the Dirichlet Laplacian in thin broken strips with angle $α$. Playing with symmetries, this leads us to investigate spectral problems for the Laplace operator with mixed boundary conditions in thin trapezoids characterized by a parameter $\varepsilon$ small. We give an asymptotic expansion of the first eigenvalues and corresponding eigenfunctions as $\varepsilon$ tends to zero. The new point in this work is to study the dependence with respect to $α$. We show that for a small fixed $\varepsilon>0$, at certain particular angles $α^\star_k$, $k=0,1,\dots$, that we characterize, an eigenvalue dives, i.e. moves down rapidly, below the normalized threshold $π^2/\varepsilon^2$ as $α>0$ increases. We describe the way the eigenvalue dives below $π^2/\varepsilon^2$ and prove that the phenomenon is milder at $α^\star_0=0$ than at $α^\star_k$ for $k\ge1$.