On a class of spectral problems on the half-line and their applications to multi-dimensional problems

Abstract

A survey of estimates on the number N-( G) of negative eigenvalues (bound states) of the Sturm-Liouville operator Gu=-u"- G on the half-line, as depending on the properties of the function G and the value of the coupling parameter >0. The central result is S1/2a giving a sharp sufficient condition for the semi-classical behavior N-( G)=O(1/2), and the necessary and sufficient conditions for a "super-classical" growth rate N-( G)=O(q) with any given q>1/2. Similar results for the problem on the whole are also presented. Applications to the multi-dimensional spectral problems are discussed.