TY - THES
AU - Jia Wang
AB - <p>Hyperspherical coordinates provide a systematic way of describing three-body systems. Solving three-body Schrödinger equations in an adiabatic hyperspherical representation is the focus of this thesis. An essentially exact solution can be found numerically by including nonadiabatic couplings using either a slow variable discretization or a traditional adiabatic method. Two diff erent types of three-body systems are investigated: (1) rovibrational states of the triatomic hydrogen ion H<sub>3</sub><sup>+</sup> and (2) ultracold collisions of three identical bosons.</p>
CY - Boulder
N2 - <p>Hyperspherical coordinates provide a systematic way of describing three-body systems. Solving three-body Schrödinger equations in an adiabatic hyperspherical representation is the focus of this thesis. An essentially exact solution can be found numerically by including nonadiabatic couplings using either a slow variable discretization or a traditional adiabatic method. Two diff erent types of three-body systems are investigated: (1) rovibrational states of the triatomic hydrogen ion H<sub>3</sub><sup>+</sup> and (2) ultracold collisions of three identical bosons.</p>
PB - University of Colorado Boulder
PP - Boulder
PY - 2012
TI - Hyperspherical Approach to Quantal Three-body Theory
ER -