Scattering on the line via singular approximation

Abstract: Motivated by applications to acoustic imaging, the present work establishes a framework to analyze scattering for the one-dimensional wave, Helmholtz, Schrödinger and Riccati equations that allows for coefficients which are more singular than can be accommodated by previous theory. In place of the standard scattering matrix or the Weyl-Titchmarsh m-function, the analysis centres on a new object, the generalized reflection coefficient, which maps frequency (or the spectral parameter) to automorphisms of the Poi… Show more

“…The set R of rotations is a subgroup of Aut P, but not a normal subgroup. The set I of irrotational elements is not a group; rather, I generates Aut P. Note that g µ,ρ extends by the formula (8) to a holomorphic function(10) gµ,ρ : D → D.(I.e., gµ,ρ is holomorphic in an…”

Theorems of Szegő-Verblunsky type in the multivariate and almost periodic settings

“…The set R of rotations is a subgroup of Aut P, but not a normal subgroup. The set I of irrotational elements is not a group; rather, I generates Aut P. Note that g µ,ρ extends by the formula (8) to a holomorphic function(10) gµ,ρ : D → D.(I.e., gµ,ρ is holomorphic in an…”

Theorems of Szegő-Verblunsky type in the multivariate and almost periodic settings