Abstract: This work is devoted to the study of some exactly solvable quantum problems of four, five and six bodies moving on the line. We solve completely the corresponding stationary Schrödinger equation for these systems confined in an harmonic trap, and interacting pairwise, in clusters of two and three particles, by two-body inverse square Calogero potential. Both translationaly and non-translationaly invariant multi-body potentials are added. In each case, the full solutions are provided, namely the normalized regular eigensolutions and the eigenenergies spectrum. The irregular solutions are also studied. We discuss the domains of coupling constants for which these irregular solutions are square integrable. The case of a “Coulomb-type” confinement is investigated only for the bound states of the four-body systems.
N° Revue: Few-Body Systems, Volume 56, Numéro1, Springer Vienna - Pagination: pp 1–17 - Date: 01/01/2015
URL: DOI: 10.1007/s00601-014-0924-1
Mots cles: BOUND STATE, COUPLING CONSTANTS, EXACT SOLUTIONS, FOUR-BODY PROBLEM, INTEGRAL CALCULUS, POTENTIALS, SCHROEDINGER EQUATION, TWO-BODY PROBLEM DIFFERENTIAL EQUATIONS, EQUATIONS, MANY-BODY PROBLEM, MATHEMATICAL SOLUTIONS, MATHEMATICS, PARTIAL DIFFERENTIAL EQUATIONS, WAVE EQUATIONS
co_auteurs: M Lassaut