Universal $T$-matrices for quantum Poincar\'e groups: contractions and quantum reference frames

TL;DR

This paper develops contraction theory for universal T-matrices of quantum groups, explicitly computes examples for (1+1) Poincaré groups, and links relativistic and non-relativistic quantum reference frame symmetries.

Contribution

It introduces a new quantum deformation of the (1+1) Poincaré algebra and applies contraction to connect it with Galilei quantum groups.

Findings

Explicit (1+1) timelike κ-Poincaré T-matrix computed

New quantum deformation of (1+1) Poincaré algebra presented

Non-relativistic limit yields Galilei T-matrix for quantum reference frames

Abstract

Universal $T$-matrices, or Hopf algebra dual forms, for quantum groups are revisited, and their contraction theory is developed. As a first illustrative example, the (1+1) timelike $\kappa$-Poincar\'e $T$-matrix is explicitly worked out. Afterwards, motivated by recent results on the role of the Hopf algebra dual form of a quantum (1+1) centrally extended Galilei group as the algebraic object underlying non-relativistic quantum reference frame transformations, a new quantum deformation of the (1+1) centrally extended Poincar\'e Lie algebra is obtained, and its universal $T$-matrix is presented. Finally, the Hopf algebra dual form contraction is applied to this Poincar\'e $T$-matrix, showing that its corresponding non-relativistic counterpart is precisely the Galilei $T$-matrix associated with quantum reference frames. In this way, the Poincar\'e Hopf algebra dual form introduced here stands as a natural candidate for describing the symmetry structure of relativistic quantum reference frame transformations. In the appropriate basis, the associated quantum Poincar\'e group is recognized, remarkably, as a non-trivial central extension of the (1+1) spacelike $\kappa$-Poincar\'e dual Hopf algebra.