English

Bundle Theory of Improper Spin Transformations

Quantum Physics 2009-11-10 v2 Mathematical Physics math.MP

Abstract

{\it We first give a geometrical description of the action of the parity operator (P^\hat{P}) on non relativistic spin 12{{1}\over{2}} Pauli spinors in terms of bundle theory. The relevant bundle, SU(2)Z2O(3)SU(2)\odot \Z_2\to O(3), is a non trivial extension of the universal covering group SU(2)SO(3)SU(2)\to SO(3). P^\hat{P} is the non relativistic limit of the corresponding Dirac matrix operator P=iγ0{\cal P}=i\gamma_0 and obeys P^2=1\hat{P}^2=-1. Then, from the direct product of O(3) by Z2\Z_2, naturally induced by the structure of the galilean group, we identify, in its double cover, the time reversal operator (T^\hat{T}) acting on spinors, and its product with P^\hat{P}. Both, P^\hat{P} and T^\hat{T}, generate the group Z4×Z2\Z_4 \times \Z_2. As in the case of parity, T^\hat{T} is the non relativistic limit of the corresponding Dirac matrix operator T=γ3γ1{\cal T}=\gamma^3 \gamma^1, and obeys T^2=1\hat{T}^2=-1.}

Keywords

Cite

@article{arxiv.quant-ph/0410079,
  title  = {Bundle Theory of Improper Spin Transformations},
  author = {D. B. Cervantes and S. L. Quiroga and L. J. Perissinotti and M. Socolovsky},
  journal= {arXiv preprint arXiv:quant-ph/0410079},
  year   = {2009}
}

Comments

8 pages, Plaintex; titled changed, minor text modifications, one reference completed