Inverse Spectral Theory for Sturm-Liouville Operators with Distributional Potentials

Abstract

We discuss inverse spectral theory for singular differential operators on arbitrary intervals (a,b) ⊂eq R associated with rather general differential expressions of the type \[τ f = 1r (- (p[f' + s f])' + s p[f' + s f] + qf), \] where the coefficients p, q, r, s are Lebesgue measurable on (a,b) with p-1, q, r, s ∈ L1loc((a,b); dx) and real-valued with p=0 and r>0 a.e.\ on (a,b). In particular, we explicitly permit certain distributional potential coefficients. The inverse spectral theory results derived in this paper include those implied by the spectral measure, by two-spectra and three-spectra, as well as local Borg-Marchenko-type inverse spectral results. The special cases of Schr\"odinger operators with distributional potentials and Sturm--Liouville operators in impedance form are isolated, in particular.