Explicit Krein Resolvent Identities for Singular Sturm-Liouville Operators with Applications to Bessel Operators

Abstract

We derive explicit Krein resolvent identities for generally singular Sturm-Liouville operators in terms of boundary condition bases and the Lagrange bracket. As an application of the resolvent identities obtained, we compute the trace of the resolvent difference of a pair of self-adjoint realizations of the Bessel expression -d2/dx2+(2-(1/4))x-2 on (0,∞) for values of the parameter ∈[0,1) and use the resulting trace formula to explicitly determine the spectral shift function for the pair.