Scattering theory for Laguerre operators

Abstract

We study Jacobi operators Jp, p> -1, whose eigenfunctions are Laguerre polynomials. All operators Jp have absolutely continuous simple spectra coinciding with the positive half-axis. This fact, however, by no means imply that the wave operators for the pairs Jp, Jq where p≠ q exist. Our goal is to show that, nevertheless, this is true and to find explicit expressions for these wave operators. We also study the time evolution of (e-J t f)n as |t|∞ for Jacobi operators J whose eigenfunctions are different classical polynomials. For Laguerre polynomials, it turns out that the evolution (e-Jp t f)n is concentrated in the region where n t2 instead of n |t | as happens in standard situations. As a by-product of our considerations, we obtain universal relations between amplitudes and phases in asymptotic formulas for general orthogonal polynomials.