Norm resolvent convergence of singularly scaled Schr\"odinger operators and δ'-potentials

Abstract

For a real-valued function V from the Faddeev-Marchenko class, we prove the norm resolvent convergence, as ε goes to 0, of a family Sε of one-dimensional Schr\"odinger operators on the line of the form Sε:= -D2 + ε-2 V(x/ε). Under certain conditions the family of potentials converges in the sense of distributions to the first derivative of the Dirac delta-function, and then the limit of Sε might be considered as a "physically motivated" interpretation of the one-dimensional Schr\"odinger operator with potential δ'.