Eigenvalues of Schr\"odinger operators near thresholds: two term approximation

Abstract

We consider one dimensional Schr\"odinger operators Hλ=-d2dx2+U+ λ Vλ with nonlinear dependence on the parameter λ and study the small λ behaviour of eigenvalues. The potentials U and Vλ are real-valued bounded functions of compact support. Under some assumptions on U and Vλ, we prove the existence of a negative eigenvalue that is absorbed at the bottom of the continuous spectrum as λ 0. We also construct two term asymptotic formulas for the threshold eigenvalues.