Some Remarks on the Spectral Problem Underlying the Camassa-Holm Hierarchy

Abstract

We consider left-definite eigenvalue problems A = λ B , with A ≥ I for some > 0 and B self-adjoint, but B not necessarily positive or negative definite, applicable, in particular, to the eigenvalue problem underlying the Camassa-Holm hierarchy. In fact, we will treat a more general version where A represents a positive definite Schr\"odinger or Sturm-Liouville operator T in L2(; dx) associated with a differential expression of the form τ = - (d/dx) p(x) (d/dx) + q(x), x ∈ , and B represents an operator of multiplication by r(x) in L2(; dx), which, in general, is not a weight, that is, it is not nonnegative a.e.\ on . Our methods naturally permit us to treat certain classes of distributions (resp., measures) for the coefficients q and r and hence considerably extend the scope of this (generalized) eigenvalue problem, without having to change the underlying Hilbert space L2(; dx). Our approach relies on rewriting the eigenvalue problem A = λ B in the form A-1/2 B A-1/2 = λ-1 , = A1/2 , and a careful study of (appropriate realizations of) the operator A-1/2 B A-1/2 in L2(; dx). In the course of our treatment we employ a supersymmetric formalism which permits us to factor the second-order operator T into a product of two first-order operators familiar from (and inspired by) Miura's transformation linking the KdV and mKdV hierarchy of nonlinear evolution equations. We also treat the case of periodic coefficients q and r, where q may be a distribution and r generates a measure and hence no smoothness is assumed for q and r.