Resonances - lost and found

Abstract

We consider the large L limit of one dimensional Schr\"odinger operators HL=-d2/dx2 + V1(x) + V2,L(x) in two cases: when V2,L(x)=V2(x-L) and when V2,L(x)=e-cLδ(x-L). This is motivated by some recent work of Herbst and Mavi where V2,L is replaced by a Dirichlet boundary condition at L. The Hamiltonian HL converges to H = -d2/dx2 + V1(x) as L ∞ in the strong resolvent sense (and even in the norm resolvent sense for our second case). However, most of the resonances of HL do not converge to those of H. Instead, they crowd together and converge onto a horizontal line: the real axis in our first case and the line (k)=-c/2 in our second case. In the region below the horizontal line resonances of HL converge to the reflectionless points of H and to those of -d2/dx2 + V2(x). It is only in the region between the real axis and the horizontal line (empty in our first case) that resonances of HL converge to resonances of H. Although the resonances of H may not be close to any resonance of HL we show that they still influence the time evolution under HL for a long time when L is large.