English

Construction of potentials using mixed scattering data

Mathematical Physics 2008-11-26 v2 High Energy Physics - Theory math.MP

Abstract

The long-standing problem of constructing a potential from mixed scattering data is discussed. We first consider the fixed-\ell inverse scattering problem. We show that the zeros of the regular solution of the Schr\"odinger equation, rn(E)r_{n}(E) which are monotonic functions of the energy, determine a unique potential when the domain of energy is such that the rn(E)r_{n}(E)'s range from zero to infinity. The latter method is applied to the domain {EE0,=0}{E=E0,0}\{E \geq E_0, \ell=\ell_0 \} \cup \{E=E_0, \ell \geq \ell_0 \} for which the zeros of the regular solution are monotonic in both parts of the domain and still range from zero to infinity. Our analysis suggests that a unique potential can be obtained from the mixed scattering data {δ(0,k),kk0}{δ(,k0),0}\{\delta(\ell_0,k), k \geq k_0 \} \cup \{\delta(\ell,k_0), \ell \geq \ell_0 \} provided that certain integrability conditions required for the fixed \ell-problem, are fulfilled. The uniqueness is demonstrated using the JWKB approximation.

Keywords

Cite

@article{arxiv.0710.3524,
  title  = {Construction of potentials using mixed scattering data},
  author = {M. Lassaut and S. Y. Larsen and S. A. Sofianos and J. C. Wallet},
  journal= {arXiv preprint arXiv:0710.3524},
  year   = {2008}
}

Comments

17 pages, 2 figures. Improved version involving an expanded introduction and additional physical considerations

R2 v1 2026-06-21T09:33:37.917Z