Strong coupling asymptotics for a singular Schroedinger operator with an interaction supported by an open arc (1207.2271v2)

Abstract: We consider a singular Schr\"odinger operator in $L^2(\mathbb{R}^2)$ written formally as $-\Delta - \beta\delta(x-\gamma)$ where $\gamma$ is a $C^4$ smooth open arc in $\mathbb{R}^2$ of length $L$ with regular ends. It is shown that the $j$th negative eigenvalue of this operator behaves in the strong-coupling limit, $\beta\to +\infty$, asymptotically as [ E_j(\beta)=-\frac{\beta^2}{4} +\mu_j +\mathcal{O}\Big(\dfrac{\log\beta}{\beta}\Big), ] where $\mu_j$ is the $j$th Dirichlet eigenvalue of the operator [ -\frac{d^2}{ds^2} -\frac{\kappa(s)^2}{4}\, ] on $L^2(0,L)$ with $\kappa(s)$ being the signed curvature of $\gamma$ at the point $s\in(0,L)$.