Inverse spectral transform for the Harry Dym equation on the complex plane

We analyze a special spectral transform of a measure supported on a compact subset C of the complex plane. A perturbation 1 of is said to be a Geronimus spectral transform if d 1 = d |z -| 2 where / ∈ C. We focus our attention in the analysis of the Hessenberg matrix associated with the multiplicati

A key basis for seeking periodic solutions of the Camassa Holm equation is to understand the associated spectral problem y$= 1 4 y+\*my. The periodic spectrum can be recovered from the norming constants and the elements of the auxiliary spectrum. The potential can then be reconstructed from the peri

## Abstract Consider the Poincare unit disk model for the hyperbolic plane **H**^2^. Let Ξ be the set of all horocycles in **H**^2^ parametrized by (__θ, p__), where __e^iθ^__ is the point where a horocycle __ξ__ is tangent to the boundary |__z__| = 1, and __p__ is the hyperbolic distance from __ξ_