The Quantum Dynamics of Two-component Bose-Einstein Condensate: an $Sp(4,R)$ Symmetry Approach

TL;DR

This paper demonstrates that the quantum dynamics of two-component Bose-Einstein condensates can be effectively described using the non-compact symplectic group $Sp(4,R)$, providing explicit wavefunctions and a geometric visualization of evolution trajectories.

Contribution

It introduces a novel $Sp(4,R)$ symmetry framework for analyzing two-component BEC dynamics, enabling explicit wavefunction solutions and geometric interpretation of evolution.

Findings

Wavefunction explicit form at any time

Trajectory mapping in a 6D manifold visualized in 2D disk

Observable dynamics linked to trajectory behavior

Abstract

The compact groups such as $SU(n)$ and $SO(n)$ groups have been heavily studied and applied in the study of quantum many body systems. However, the non-compact groups such as the real symplectic groups are less touched. In this paper, we will reveal that the quantum dynamics of two-component Bose-Einstein condensate can be described by a \emph{non-compact} real symplectic group $Sp(4,R)$. With this group, we can give a explicit form for the wavefunction in any time of the evolution, meanwhile, map this whole time evolution to a trajectory in a six-dimensional manifold. By introducing a polar coordinate, we can visualize this six-dimensional manifold in 2d unit disk and reveal the relation between the behavior of the trajectory in this manifold and the eigen-energies of the Hamiltonian. Furthermore, the time evolution of expectation value of a physical observable such as number operator is proven closely related to the behavior of the trajectory in this manifold.