An application of Carleman inequalities for a curved quantum guide (Q2906697)

The author considers the Schrödinger operator \(-i\partial _t-\Delta\) in \(\Omega\times(0,T)\), where \(T>0\) and \(\Omega\subset \mathbb{R}^2\) is a curved quantum guide with a fixed width \(d>0\). Under some assumptions on the signed curvature \(\gamma\) of the function characterizing the reference curve, and on the weigh function \(\widetilde{\beta}\), the author presents a Carleman estimate for a function \(q\in L^2(-T,T;H^1_0(\Omega_{\mathbb{R},\epsilon})\) and a local estimation for the difference of two signed curvatures.NEWLINENEWLINEFor the entire collection see [Zbl 1239.00060].