Schrödinger operators with $δ$-potentials supported on unbounded Lipschitz hypersurfaces

Abstract: In this note we consider the self-adjoint Schr\"odinger operator $\mathsf{A}\alpha$ in $L^2(\mathbb{R}^d)$, $d\geq 2$, with a $\delta$-potential supported on a Lipschitz hypersurface $\Sigma\subseteq\mathbb{R}^d$ of strength $\alpha\in L^p(\Sigma)+L^\infty(\Sigma)$. We show the uniqueness of the ground state and, under some additional conditions on the coefficient $\alpha$ and the hypersurface $\Sigma$, we determine the essential spectrum of $\mathsf{A}\alpha$. In the special case that $\Sigma$ is a hyperplane we obtain a Birman-Schwinger principle with a relativistic Schr\"{o}dinger operator as Birman-Schwinger operator. As an application we prove an optimization result for the bottom of the spectrum of $\mathsf{A}_\alpha$.