Geometric Phase of the Two-Particle Bethe Wavefunction

TL;DR

This paper investigates how the geometric phase in a two-boson system on a ring with a defect is affected by interactions, revealing that interactions increase the geometric phase, with implications for quantum gyroscope and accelerometer designs.

Contribution

It introduces a detailed analysis of the geometric phase in an interacting two-boson system using the Lieb-Liniger model, highlighting the impact of interactions on phase accumulation.

Findings

Interaction increases the geometric phase for a given parameter variation.

Energy spectrum depends on defect and interaction parameters.

Results have implications for quantum gyroscope and accelerometer applications.

Abstract

We consider a problem of geometric phase generation in a system of two interacting bosons confined in a narrow ring potential with a localized defect. Geometric phase emerges from variation of parameters of the defect. Particle interaction is taken into account within a framework of the Lieb-Liniger model. The energy spectrum is evaluated and its dependence on the parameters of the problem is described. It is shown that the interaction leads to increase of the geometric phase for a given contour of variations. The work is motivated by earlier proposed ideas of quantum gyroscope and quantum accelerometer based on atomic Bose-Einstein condensates.