On self-adjoint boundary conditions for singular Sturm-Liouville operators bounded from below

Abstract

We extend the classical boundary values align* & g(a) = - W(ua(λ0,.), g)(a) = x a g(x) ua(λ0,x), \\ &g[1](a) = (p g')(a) = W( ua(λ0,.), g)(a) = x a g(x) - g(a) ua(λ0,x)ua(λ0,x) align* for regular Sturm-Liouville operators associated with differential expressions of the type τ = r(x)-1[-(d/dx)p(x)(d/dx) + q(x)] for a.e. x∈[a,b] ⊂ R, to the case where τ is singular on (a,b) ⊂eq R and the associated minimal operator Tmin is bounded from below. Here ua(λ0, ·) and ua(λ0, ·) denote suitably normalized principal and nonprincipal solutions of τ u = λ0 u for appropriate λ0 ∈ R, respectively. We briefly discuss the singular Weyl-Titchmarsh-Kodaira m-function and finally illustrate the theory in some detail with the examples of the Bessel, Legendre, and Kummer (resp., Laguerre) operators.