Coupling constant dependence for the Schr\"odinger equation with an inverse-square potential

Abstract

We consider the one-dimensional Schr\"odinger equation -f''+qα f = Ef on the positive half-axis with the potential qα(r)=(α-1/4)r-2. It is known that the value α=0 plays a special role in this problem: all self-adjoint realizations of the formal differential expression -∂2r + qα(r) for the Hamiltonian have infinitely many eigenvalues for α<0 and at most one eigenvalue for α≥ 0. We find a parametrization of self-adjoint boundary conditions and eigenfunction expansions that is analytic in α and, in particular, is not singular at α = 0. Employing suitable singular Titchmarsh--Weyl m-functions, we explicitly find the spectral measures for all self-adjoint Hamiltonians and prove their smooth dependence on α and the boundary condition. Using the formulas for the spectral measures, we analyse in detail how the "phase transition" through the point α=0 occurs for both the eigenvalues and the continuous spectrum of the Hamiltonians.