Schrödinger operators with complex singular potentials (Q2850443)

The authors consider Schrödinger operators \(S(q)\) on \(L^2(\mathbb R)\) with complex-valued distribution potentials \(q=Q'+\tau\), where the derivative is understood in the distribution sense, NEWLINE\[NEWLINE \sup\limits_{t\in \mathbb R}\int\limits_t^{t+1}| Q(s)| ^2\, ds<\infty ,\quad \sup\limits_{t\in \mathbb R}\int\limits_t^{t+1}| \tau (s)| \,ds<\infty. NEWLINE\]NEWLINE They establish the equivalence of various definitions of \(S(q)\), investigate their approximations by operators with smooth potentials, and study the location of the spectrum of \(S(q)\).